The Composition of Thoughts
Richard G Heck Jr and Robert May
Brown University and the University of California, Davis
Among the many innovations that mark Frege’s Begriffsschrift as a revolutionary work, perhaps the most important is its presentation of the first formal system
of logic. Frege believed that the introduction of a new notation, especially for the
expression of generality, was necessary if the logical relationships between contents were to be made apparent. This new notation made it possible, at least in an
important range of cases, to establish that a given content could be inferred from
certain other contents simply by examining the structure of the sentences that expressed those contents.1 In this regard, Frege’s great advance was that, in his system, the logical rules could be stated in purely formal terms, without any reference
to the contents expressed by the sentences of his formal language, Begriffsschrift,
the conceptual notation. But it is important to recognize that logic, according to
Frege, is not ‘formal’ in any sense that would oppose form to content: The sentences of Begriffsschrift are not mere forms. Frege’s goal was “not. . . to present
an abstract logic in formulas, but to express a content through written symbols in
a more precise and perspicuous way than is possible with words” (AimCN, pp.
90–1). Frege’s formal system is intended to be one we can actually use in reasoning, that is, in inferring truths from other truths, which is to say that we can prove
theorems in this system, where theorems are true contents.2 If so, the sentences
of Begriffsschrift must express those contents. The point of presenting proofs in a
formal system is thus not to empty mathematics of content (FTA, esp. opp. 97ff.),3
1
Much of the discussion in this paper will concern a period during which Frege’s views and
terminology were in transition, but we shall generally use the term ‘content’ to refer to the intuitive notion that Frege’s technical notions of ‘conceptual content’, ’sense’, and ’reference’ were
supposed to capture.
2 This point is found throughout Frege’s writings, both early, when he is comparing his logic to
Boole’s (BLC, pp. 12–13), and later, in his debate with Hilbert (Geo1; Geo2). It is rightly echoed
in van Heijenoort’s (1967) insistence that, for Frege, logic is a language and not just a calculus.
3 Page references marked by “op.” and “opp.” are to the pages in the original publication. These
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The Composition of Thoughts
nor even to make us more certain of what we are proving (Gl, §2), but rather to
force every assumption on which a given proof depends to be made explicit, so
that the grounds on which the result rests can be reliably ascertained (Bg, preface;
Gg, v. I, p. vii; PCN, pp. 362–3). This is what Frege intends by his insistence that
proofs must be rigorous and ‘gap-free’. Only then can we be certain that we have
shown how a truth follows from other truths.
Given Frege’s perspective, what makes formalization possible is thus the fact
that, in Begriffsschrift, the logical properties of contents are made visible in the
signs that express those contents. And that, Frege seems to have understood from
the start, is because these signs—the sentences of Begriffsschrift—are composed
of parts that have their own contents, contents that together determine the content
of the sentence. The expression ‘22 = 4’, for example, occurs in the expression
‘22 = 4 → 24 = 16’, and, as a part of the latter sentence, it has the very same
content it has when it occurs on its own.4 Of course, Frege was hardly the first
to gesture in the direction of the principle of compositionality. But what distinguished Frege from his predecessors—and what made it possible for Frege to
develop the first compositional semantics for a language of reasonable expressive
power—is that he understood what the really hard question was: How exactly are
the contents of the parts supposed to combine to yield the content of the whole?5
This paper tells the story of Frege’s struggle with that question.
There are two familiar models for understanding this sort of composition. The
first is the composition of a sentence from its parts. A sentence consists of its
parts in a straightforward sense: The concatenation of a noun phrase and a verb
phrase simply is a sentence, just as a top set upon four legs simply is a table;
the table is not something other than the top set upon the legs, and the sentence
is not something other than the noun phrase concatenated with the verb phrase.6
The second model is the application of a function to an argument. The result of
applying a function to an argument is not (normally) a complex consisting of the
function and the argument. It is, rather, the value of the function for that argument.
are indicated in the margins of the Collected Papers (Frege, 1984) and of the Frege Reader (Frege,
1997).
4 This is Geach’s (1965) famous ‘Frege point’.
5 Frege’s appreciation of this fact was also a consequence of his new understanding of generality: Despite the surface similarities, the way the parts are combined in a sentence like ‘Socrates is
mortal’ is very different from how they are combined in a sentence like ‘All men are mortal’. (See
PMC, pp. 100–1, for example.)
6 The question what exactly the relationship is between a table and its parts, being a philosophical question, is of course controversial. But a sentence wholly consists of its parts in whatever
sense a table wholly consists of its parts.
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This model of composition is the one Frege ultimately applies in the realm of
reference: A concept is a function from objects to truth-values, and the reference
of a (non-embedded) sentence is its truth-value; “Frege had a beard” refers to
the truth-value that is the result of applying the ‘concept-function’ denoted by
the predicate to the object denoted by the subject. But it is obvious that, for the
mature Frege, this cannot be a complete answer to the question how the content of
a sentence is determined from the contents of its parts, since we thereby explain
only how the reference of the whole is determined by the references of the parts.
A complete answer must also explain how the sense of the whole is determined
by the senses of the parts. And Frege is much less explicit about how thoughts
are composed from senses, even though the answer is essential to his enterprise:
Without it, we will not understand how formal relations among expressions might
reflect logical relations among their contents. Logical relations do not hold among
contents simply in virtue of facts about reference. This, as we shall see, is one of
the many lessons of Frege’s famous puzzle about substitution.
We shall be arguing that Frege’s account of how language expresses content
can fulfill the explanatory ambitions he has for it only if thoughts are composed
in a manner akin to the first model: A thought is constituted from its consituent
senses much in the way a sentence is constituted from its constituent phrases. As
Frege puts it, “To the structure of the thought there corresponds the compounding
of words into sentences” (Neg, p. 378, op. 148) A thought in this regard is a complex. The central questions we want to address here are why Frege is committed
to this view and what its implications are.
The question whether thoughts are compositionally complex has been much
discussed,7 but it remains controversial, although the textual case for an affirmative answer is prima facie quite strong. In Grundgesetze, for example, Frege
expresses the view that thoughts have parts quite directly: “If a name is part of a
name of a truth-value [that is, a sentence], then the sense of the former name is
part of the thought expressed by the latter name” (Gg, v. I, §32). That said, however, Frege suggests in “On Sense and Reference” that we can also say that the
reference of a part of a complex expression is part of the reference of the whole
expression (SM, p. 165, opp. 35–6), but this is an absurd suggestion given Frege’s
other commitments. The reference of ‘Annette’ is not part of the reference of ‘the
father of Annette’. One might therefore be tempted to take neither suggestion
seriously. But Frege qualifies the suggestion that references are compositionally
7
The contributors include Hans Sluga (1980), Steven Wagner (1983), David Bell (1987),
Michael Dummett (1991b), and James Levine (2002), among many others.
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The Composition of Thoughts
complex when he makes it—he says that he is using “the word ‘part’ in a special
sense” and remarks that, really, “[a] special term would need to be invented” (SM,
p. 165, opp. 35–6)—and he later disowns this suggestion even while reaffirming
his commitment to the view that thoughts are compositionally complex:
We can regard a sentence as a mapping of a thought: corresponding
to the whole–part relation of a thought and its parts we have, by and
large, the same relation for the sentence and its parts. Things are
different in the domain of reference. We cannot say that Sweden is a
part of the capital of Sweden. (Darm, p. 255)
And, we find the following remarks in Carnap’s notes on Frege’s lectures of 1913:8
The reference of the parts of a sentence are not parts of the reference
of the sentence.
However: The sense of a part of the sentence is part of the sense of
the sentence. (Reck and Awodey, 2004, p. 87)
Such passages are undeniably suggestive, but we cannot expect to resolve the
question whether Frege regarded thoughts as compositionally complex simply by
exhibiting proof-texts. Unless the claim that thoughts are compositionally complex can be shown to play a significant role in Frege’s considered views, remarks
like the one just quoted can be dismissed as mere slips. So we shall need to consider what role this doctrine might play.
We will proceed as follows. We shall begin, in section 1, by discussing Frege’s
earliest views on these issues, arguing that, although Frege did regard conceptual
contents as inherently unstructured in Begriffsschrift, he began almost immediately thereafter to move away from that view and towards one on which conceptual contents are composed of parts corresponding to ‘function’ and ‘argument’.
This change was connected with a broader change in Frege’s view of language,
which then took on a strictly representational role: Linguistic terms designate
elements of content, what Frege calls “objective ideas” in Die Grundlagen. But
Frege’s initial way of understanding the relation between linguistic items and their
contents turns out to be unstable. This is the most immediate lesson of Frege’s famous puzzle about the substitution of co-referental expressions, as we will bring
out in section 2. We argue there that this puzzle forced Frege to abandon his earlier conception of how the conceptual content of a sentence was determined by
8
We have changed the translation of ‘Bedeutung’ from ‘meaning’ to ‘reference’.
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The Composition of Thoughts
Concepts and Conceptual Articulation
the contents of its parts and, in doing so, posed in an especially sharp form the
question why “The evening star is a planet” and “The morning star is a planet”
have different contents. We consider Frege’s response to this question in section
3, arguing that it depends essentially upon the claim that the senses of the proper
names that occur in the two sentences just mentioned are parts of the thoughts
those sentences express. However natural this view may seem, however, a proper
development of it requires an answer to the question how thoughts are composed
from senses, that is, to the question what in the realm of sense corresponds to the
syntactic operation of concatenation. We turn to this question in section 4, arguing
that it should be understood not as a metaphysical question but as a semantic one:
The question concerns not the intrinsic nature of residents of the ‘third realm’
but how thoughts are expressed by sentences and how thoughts determine truthvalues.
1
Concepts and Conceptual Articulation
Throughout Frege’s thinking about content, there is an underlying theme that remains invariant: that we have no direct cognitive access to content.9 The reason
for this, however, has nothing to do with whether we can apprehend objects, qua
elements of content. Rather, the problem is that mere apprehension of entities is
not tantamount to having knowledge of them; for instance, we have, according to
Frege, intuitive access to geometrical entities, but that, in and of itself, is not sufficient for any substantial knowledge about space. What makes knowledge possible
is our ability to apprehend something else about content, its logical structure; only
through our apprehension of this structure can we know of the properties and relations that hold of any objects that we may apprehend, and hence what is true
of them. But we have no direct cognitive grip on this structure and hence no direct grip on content itself. Rather, there must be some mediating system, to which
we can be cogntively related, which provides, in some relevant sense, the requisite
access to structure. Thus, at base, the issue for Frege begins, and remains throughout, the nature of the mediating system through which we can grasp the structure
of content. What varies in Frege’s thought is his conception of the nature of the
system that displays the structure of content for us; the shift we encounter is from
a system that is itself external to content, through which structure is “viewed”
from without, to one that is internal to content, structuring it from within.
As noted, Frege was interested in the correlations his logic revealed between
9
With one exception. We do have direct cognitive access to senses; we grasp them.
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The Composition of Thoughts
Concepts and Conceptual Articulation
formal relations and logical relations. There is nothing terribly original about the
view that logic is formal in some such sense. What was original was Frege’s
conception of how sentences and the contents they express are structured. In logic
as it existed prior to Frege, sentences, or judgements,10 were constructed from
predicates using a small number of operators corresponding to traditional forms
of judgment, such as universal affirmative judgments of the form ‘All Fs are G’.
Proper names, such as ‘Socrates’, were regarded as predicates, that is, as being
of the same logical type as expressions like ‘is mortal’. Frege came to believe,
however, that this traditional identification of names as predicates is incompatible
with the proper representation of generality—in particular, with the representation
of scope—and what Frege himself advertises as the cornerstone of his advance in
Begriffsschrift is his insistence that sentences must be regarded as constructed
from arguments and functions. For example, in the sentence ‘Socrates is mortal’,
if we take the argument to be ‘Socrates’, then the function is “the part that remains
invariant in the expression” when we replace ‘Socrates’ by other names, such as
‘Plato’ or ‘Thales’ (Bg, §9).
There is a lineage, an important one, between the function–argument distinction as Frege initially draws it and his later distinction between concept and object.
But there are also important discontinuities, centered on Frege’s insistence in Begriffsschrift that the distinction between function and argument “has nothing to
do with the conceptual content, but only with our way of viewing it” (BgBynum,
§9).11 What are we to make of this remark? First off, it appears that Frege is being
explicit that the notions of function and argument are not to be taken as internal
aspects of content itself, but rather as external to it. But Frege is also saying that
function and argument are the tools for analyzing content; it is how we “view”
content. Thus, an analysis in terms of function and argument, while not part of
content, is nonetheless essential if content is to be represented in such a way that
it can be comprehended as having logical or, as Frege puts it in Begriffsschrift,
conceptual structure. Accordingly, it is natural for Frege to say, in describing the
proper application of the terms ‘function’ and ‘argument’ that:
10
Prior to Frege, use and mention were not carefully distinguished; indeed, Frege can be accused
of being none too observant himself, especially in his earlier writings. But see the discussion at
the end of this section.
11 That is Bynum’s translation. van Heijenoort reads it: “. . . has nothing to do with the conceptual content; it comes about only because we view the expression in a particular way”. That just
seems wrong, because what we are viewing is not the expression but the content. The German is:
“Diese Unterscheidung hat mit dem begrifflichen Inhalte nichts zu thun, sondern ist allein Sache
der Auffassung.”
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Concepts and Conceptual Articulation
If, in an expression (whose content need not be assertable), a simple
or a complex symbol occurs in one or more places and we imagine
it as replaceable by another [symbol] (but the same one each time)
at all or some of these places, then we call the part of the expression
that shows itself invariant [under such replacement] a function and
the replaceable part its argument. (Bg, §9)
Frege’s point here is that functions and arguments are to be understood as expressions of the conceptual notation, that is, as linguistic symbols. The function of
Frege’s ‘content stroke’, he tells us, is to “tie[] the symbols [for functions and arguments] which follow it into a whole”. If we suppose that what an expression so
composed represents is a particular formal analysis of content—function and argument being the analytic terms provided by Begriffsschrift for a structural analysis of judgeable content—then content can be depicted as structurally divided
between function and argument when ‘viewed’ through the lens of language, a
language, that is, with the expressive resources of the conceptual notation.12 Thus,
for Frege, the issue is not whether the content Socrates is mortal divides itself into
function and argument in any determinate way. Rather, it is that one could regard
‘Socrates’ as the argument and ‘is mortal’ as the function, but one could equally
well regard ‘is mortal’ as the argument and ‘Socrates’ as the function.13,14 In Begriffsschrift, the issue is not whether content has an inherent or intrinsic structure
12 So the shortcoming of natural languages, for Frege, is that they do not permit content to be
logically viewed or regarded, at least not to the standard of rigor and precision that Frege requires
for the business at hand.
13 This is so, according to Frege, as long as the terms both have ‘determinate’ meanings, in the
sense that the meaning of one does not depend upon the meaning of the other. This is true of
both ‘Socrates’ and ‘is mortal’” but not of ‘all men’. Rather, terms like these are indeterminate in
and of themselves; their meanings depend upon that of other (determinate) terms. Accordingly,
‘All men are mortal’ will inherently have a conceptual organization that reflects this relation, so
that “the whole splits up into function and argument according to its own content, and not just
according to our way of looking at it” (BgBynum, §9). This seems much like what Frege would
later say about ‘Socrates is mortal’: ‘Socrates’ is a proper name, and refers to an object, ‘ξ is
mortal’ is a predicate, and refers to a function (a concept), and how we regard them is irrelevant to
this classification. See below for further discussion.
14 Afficionados will note that we did not just say that one can regard ‘ξ is mortal’ as the argument
and the second-level concept ‘Φ(Socrates)’ as the function, which is how Frege would have seen
the matter in his later work. The reason is that there is no notion of ‘second-level concept’ to
be found in Begriffsschrift. And similarly, there is no clear distinction between first- and secondorder quantification. There is but one axiom of universal instantiation, proposition 58, and it is
used indiscriminately to justify both what we would regard as first-order inferences and what we
would regard as second-order inferences.
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The Composition of Thoughts
Concepts and Conceptual Articulation
and, if not, what might be its source. Rather what is at issue is the analytic priority
of language for logically comprehending that structure, regardless of whether it is
exposed or imposed by language; it is only through our grasp of Begriffsschrift
that we have access to the logical structure of content. Language, then, has a very
special role in Frege’s earliest work: It is the locus of the structural relation of
function and argument, the structure we must view content as having if we are
to have the logical wherewithal to show how true contents follow from other true
contents.
Thus, for Frege at the time of Begriffsschrift, the prime role of language was to
reveal the conceptual organization of content. Although external to content, language is nevertheless the locus of compositional complexity vis-á-vis content. But
whatever merits Frege may have perceived in seeing things this way, there was a
problem that could not have escaped his notice for long. If function and argument
are linguistic notions, then the complex that results from their composition—what
Frege designates by the addition of the content stroke—is also linguistic; what
we have is a linguistic complex whose constituent parts are linguistic expressions,
including a ‘function’ and an ‘argument’. What the combination of function and
argument yields is therefore just a sentence. But if so, then it is hard to see how
function–argument analysis helps us understand how the formal properties of sentences of Begriffsschrift might reflect the logical properties of their contents; no
connection has yet been established between the function–argument analysis of
a given sentence and any features at all of its content. But if so, then there is a
large semantic lacuna in the exposition of Begriffsschrift: We have been given no
particular reason to suppose that the formal manipulations perform as advertised,
that is, not only that they are rigorous and gap-free, but that they take us from
truths to truths. This lacuna is one that Frege almost immediately sets out to fill.
The initial step in Frege’s re-orientation occurred shortly after the publication
of Begriffsschrift. Almost everyone who reviewed the book criticized Frege for
his not having discussed Boolean logic,15 and Frege therefore wrote a paper in
1881, “Boole’s Logical Calculus and the Begriffsschrift”, that was intended to explain the motivation behind his new approach.16 Frege there makes the following
15
Hardest on Frege in this regard was John Venn. Ernst Schroeder, the leading German Boolean
logician, was rather more sympathetic, if still uncomprehending of Frege’s accomplishments. It
appears that they were right to take Frege to task, as apparently at the time of writing Begriffsschrift, Frege was not familiar with Boole. The reviews are collected in the Bynum edition of
Begriffsschrift (BgBynum). Risto Vilkko (1998) has an insightful discussion of their content.
16 Although this paper was not published during Frege’s lifetime, he submitted it for publication
on three separate occasions—see the editors’ notes—so we may regard it as representing Frege’s
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Richard G. Heck and Robert May
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The Composition of Thoughts
Concepts and Conceptual Articulation
remarks:
If. . . you imagine the 2 in the content of possible judgement 24 = 16
to be replaceable by something else, by −2 or by 3 say, which may
be indicated by putting an x in place of the 2:
x4 = 16,
the content of possible judgement is thus split into a constant and a
variable part. The former, regarded in its own right but holding a
place open for the latter, gives the concept ‘4th root of 16’. . . . And so
instead of putting a judgement together out of an individual as subject
and an already formed concept as predicate, we do the opposite and
arrive at a concept by splitting up the content of possible judgement.
(BLC, pp. 16–17)
When Frege remarks that a concept is to be “regarded in its own right but holding
a place open for” a suitable argument, this is highly suggestive of a view very
different from that of Begriffsschrift. While Frege does not use the words “incomplete” and “unsaturated” until the following year (PMC, p. 101), saying that a
concept has a place in it that is held open for an object is obviously very much in
the same spirit. And if it is to make any sense at all to speak of replacing the object
2 with other objects in the content of possible judgement 24 = 16, then the object
2 must itself occur in that content—it must somehow be a part of it—as must what
remains constant when this part is varied; that is to say, the content itself must be
articulated as concept and object.17 If so, then there has been a significant change
in Frege’s view, for now there is a structure inherent to content, that of concept
and object. The very distinction between these introduces the connection to truth:
“In the case of a concept, it is always possible to ask whether something, and if
so what, falls under it, questions which are senseless in the case of an individual”
(BLC, p. 18). It is but a quick step from “falling under” to truth.
One might be tempted to object at this point that there is really no shift in
Frege’s view here, but that he is simply confusing use and mention. In Begriffsschrift, so the objection would go, Frege speaks as if functions and arguments are
considered view at the time.
17 Frege does not commit himself here on the question whether there is a unique best articulation
of the content. For discussion, see the exchange between Bell (1987) and Dummett (1991b) and
the more recent contributions by Rumfitt (1994), Levine (2002) and Textor (2009), and see note
71 for some remarks on the issue.
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The Composition of Thoughts
Concepts and Conceptual Articulation
(parts of) expressions: When we replace the name ‘Socrates’ with other names
in the expression ‘Socrates is mortal’, the function we discover is “the part that
remains invariant in the expression” (Bg, §9, our emphasis). But, the objection
might continue, we need not conclude from this that Frege’s considered view was
that functions were linguistic expressions: It would be enough to suppose that,
in 1879, he was no clearer about the distinction between use and mention than
were his contemporaries. And if so, Frege’s remarks in “Boole’s Logical Calculus” about replacing the object 2 with other objects need not be taken to indicate
any change in his views about conceptual content. While Frege does, that is to
say, speak of replacing the object 2 with other objects in the content of possible
judgement 24 = 16, perhaps this is just loose talk; he really means to be speaking,
as he did in Begriffsschrift, of replacing the expression ‘2’ by other expressions in
the sentence ‘24 = 16’.
It is no doubt true that, by contemporary standards, Frege does tend to run use
together with mention, but he is hardly unaware of the distinction. His emphatic
claim that the function–argument distinction is not a distinction in content shows
his awareness of it. His view that the function–argument distinction is one drawn
within language and not within content makes sense only if use is being distinguished from mention—if content is being distinguished from language. Indeed,
during the period we are discussing, it becomes increasingly important to Frege
clearly to distinguish between content and language, between content structured in
its own right, and how language represents that structure. We can see this emerge
in the continuation of the remarks quoted above from “Boole’s Logical Calculus”:
. . . [I]nstead of putting a judgement together out of an individual as
subject and an already previously formed concept as predicate, we
do the opposite and arrive at a concept by splitting up the content of
possible judgement. Of course, if the expression of the content of
possible judgement is to be analysable in this way, it must already be
itself articulated. We may infer from this that at least the properties
and relations which are not further analysable must have their own
simple designations. But it doesn’t follow from this that the ideas of
these properties and relations are formed apart from objects: on the
contrary, they arise simultaneously with the first judgement in which
they are ascribed to things. Hence, in Begriffsschrift, their designations never occur on their own, but always in combinations that express possible contents of judgement. . . . A sign for a property never
appears without a thing to which it might belong being at least in10
Richard G. Heck and Robert May
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The Composition of Thoughts
Frege’s Puzzle About Substitution
dicated, a designation of a relation never without indication of the
things which might stand in it. (BLC, p. 17)
Here Frege is quite carefully distinguishing between properties and relations, on
the one hand, and our representations of them, on the other. Indeed, Frege seems
to be arguing here that ‘signs for properties’ and ‘designations of relations’ must
always occur in complexes, along with appropriate expressions in their argumentplaces, because our ideas of what they designate are not “formed apart from objects” but only through their combination, in judgment.18
Beginning about 1881, then, and essentially continuing through Grundlagen,
Frege takes on a conception of the relation between language and content that is
opposed to his initial position in Begriffsschrift. As the view that the distinction
between function and argument has “nothing to do with the conceptual content”
fades away, we find a new view emerging, according to which language repesents
a structure already inherent in content, a structure characterized by the distinction
between concept and object. And this change, we have argued, is well-motivated:
It is needed if Frege is to align the formal notion of structure with the logical one,
which he must, since only then can the structural articulation of sentences serve
to reveal the logical properties of their contents. As we shall now see, however,
this new view is incompatible with other assumptions central to Frege’s thought.
2
Frege’s Puzzle About Substitution
Readers no doubt will have noticed a terminological change during the course of
the previous section. Whereas we began by considering functions, we ended by
discussing concepts. To a large extent, this terminological shift highlights a more
substanative one due to Frege’s sharpening his conception of the relation between
language and content in the two or three years following the publication of Begriffsschrift. As we have seen, concepts, on Frege’s emended view, are ‘unsaturated’
parts of content of a sort fundamentally different from objects. But they are also
what function–argument analysis reveals to us; the analysis of a content into function and argument is now clearly intented to reflect structural features inherent
within content itself. Frege’s identification of concepts as functions is simply the
result of this shift, and it is supposed to reveal something fundamental about the
role concepts play in logic, that is, in the logical articulation of content. It is from
18
As we shall see, the order of explanation is reversed in Frege’s mature philosophy.
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The Composition of Thoughts
Frege’s Puzzle About Substitution
the logical perspective that concepts are to be characterized as functions; logically
speaking, concepts are functions.
But the identification raises an odd problem. Not all functions are concepts.
For example, the addition function is not a concept.19 So there must be something
that distinguishes concept-functions, as a class, from ordinary functions. The
natural suggestion is that this difference is to be found in their arguments and
values, in what constitutes the domain and range of these functions. We need not
dwell on the question what the arguments of concept-functions are supposed to be:
They are objects, the contents of names.20 It is not so obvious, however, what the
values of concept-functions were supposed to be. So consider a simple sentence
of the form Fa. One would have supposed that applying the concept-function that
is the content of F to the object that is the content of a should yield the content of
the complex expression that they together constitute. Otherwise, it is hard to see
how the analysis of that content into function and argument is supposed to help us
understand how the content is structured. So Frege’s view at this time must have
been the following: A proper name has as its content an object; a predicate has
as its content a function from objects to conceptual contents; and the conceptual
content of a sentence of the form Fa, which is a content of possible judgement, is
the result of applying the function that is the content of F to the object that is the
content of a.21
But this position is inconsistent with other of Frege’s commitments. If the
content of a sentence Fa is the result of applying the function that is the content
of F to the object that is the content of a, so that the content of:
(E)
The Evening Star is a planet
is the result of applying the function that is the content of ‘ξ is a planet’ to the
object that is the content of ‘the Evening Star’, then its content must be the same
as that of:
(M)
The Morning Star is a planet.
19
We ignore the concept horse problem here and limit our attention to what Frege would later
call first-level concepts.
20 Frege held already in Begriffsschrift that the content of a proper name is the object it denotes
(Bg, §8).
21 Our sense is that most people who have considered this question have come to the same
conclusion we have. See, for example, the recent discussion by Michael Beaney (2007). We shall
see some additional evidence in favor of this interpretation below. See note 40.
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And this conclusion would have been unacceptable to Frege.22
To see why, consider the following remarks from Begriffsschrift:
. . . [T]he contents of two judgements may differ in two ways: either
the consequences derivable from the first, when it is combined with
certain other judgements, always follow from the second, when it is
combined with these same judgements, or this is not the case. The two
propositions, “The Greeks defeated the Persians at Plataea” and “The
Persians were defeated by the Greeks at Plataea” differ in the first
way. . . . Now I call that part of the content that is the same in both the
conceptual content. . . . Everything necessary for a correct inference is
expressed in full, but what is not necessary is generally not indicated;
nothing is left to guesswork. (Bg, §3, empahsis in original)
Some commentators have found in this passage the claim that, if A and B have the
same consequences, then they must also have the same content; it is a short step
from this to an inferentialist conception of content. We don’t read the passage
that way, but we need not enter this controversy here. A weaker thesis is clearly
enough present: If two judgements have different consequences, then they have
different conceptual contents. But it is obvious that (E) and (M) have different logical consequences, since it is certainly no truth of logic that the Evening Star is the
Morning Star.23 Hence, (E) and (M) must have different conceptual contents.24
How, then, can Frege avoid the conclusion that (E) and (M) must have the
same content? He cannot give up the thesis that the content of a proper name is
its bearer; that is central to his understanding of identity as objectual.25 He cannot
22
Thomas Ricketts (2005, pp. 23–4) reads this part of Frege’s argument in much the same way
we do.
23 The contrary thesis has been held (Marcus, 1995). But that was before Kripke (1980) showed
us the differences between logical, metaphysical, and epistemic necessity.
24 The point Frege is making in the quoted passage seems badly expressed. The underlying idea
is that conceptual content is what matters to logic: logical differences between judgements imply
differences in conceptual content. But even if a = b is a truth of logic, it is still logically different
from a = a. Perhaps the right thing to do here would be to introduce some notion of ‘immediate’
consequence and say that judgements have the same conceptual content if they have the same
‘immediate’ consequences. But Frege never pursues the matter, in large part, we suspect, because
his notion of content soon changes so dramatically that the question is no longer important. That
said, Bob Hale (2001a; 2001b) has worked hard to reconstruct some such notion. Unfortunately,
the attempt has serious problems (Potter and Smiley, 2001, 2002).
25 Contrary to what often seems to be assumed, the transition from the earlier view that identity
is a relation between names to the later view that it is a relation between objects occurs well before
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give up the thesis that concepts are functions;26 that is key to his understanding
of logical generality. Nor can he give up the principle that the content of a simple
sentence like (E) or (M) is fully determined by the contents of its parts, since that
is just an aspect of his treatment of concepts as functions: If predicates denote
functions, then the value of any such function will be determined by the value of
its argument, just as the value of the function ξ 2 is determined by the value of its
argument. But if all of these are non-negotiable, then there is an antinomy within
Frege’s developing philosophy of logic. Something else must go, and there is
only one thing that can go: The values of concept-functions cannot be conceptual
contents. More precisely, the conceptual content of Fa cannot be the result of
applying the concept-function that is the content of F to the object that is the
content of a.
The immediate question that faces Frege, then, is what the values of conceptfunctions are, if they are not conceptual contents. The key insight leading to
the answer is already in place by 1882, when, in the remark cited above, Frege
insists that what distinguishes concepts from objects is that a concept is the kind
of thing under which an object does or does not fall (PMC, p. 101). If this is
what is distinctive of concepts, then this is what concept-functions must capture
if they are to be worthy of the name. What Frege eventually realized was that it is
therefore sufficient to take the values of concept-functions to be truth-values, truth
and falsity corresponding to whether an object falls under a concept or not. This
of course was Frege’s mature view. As he puts it in Grundgesetze, “. . . it seems
appropriate straightforwardly to call a concept a function whose value is always a
truth-value” (Gg, v. I, §3). But the change occurred considerably earlier.
This new treatment of concepts as characteristic functions was deeply embedded in Frege’s thinking no later than 1884.27 The evidence is as follows. In
“Boole’s Logical Calculus”, which dates from 1881, Frege explictly rejects the
view that concepts are extensional. Indeed, he does not just insist that concepts
are intensional: He uses the claim that there can be more than one concept true
the publication of “On Sense and Reference” in 1891. As May (2001) notes, the change has clearly
occurred already by Die Grundlagen, and there is strong evidence, in fact, that it is already in place
by 1881 (Heck, 2013; Heck and May, 2006).
26 Note that the argument requires only the claim that the meaning of the predicate determines a
function from objects to conceptual contents; it does not require in fact the claim that the meaning
of a predicate is such a function. See also note 34.
27 We have discussed the reasons Frege came to this view elsewhere (Heck and May, 2006, §3).
They are connected with Frege’s discovery of truth-functions, which probably emerged as a result
of his reading of Boole. This connection reinforces the argument we are about to give.
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just of the Earth as a premise in an argument for the important thesis that concepts must be distinguished from objects, in particular, that we must distinguish
concepts true of just the Earth from the Earth itself (BLC, p. 18). Three years
later, however, in Die Grundlagen, Frege says, in an infamous footnote, that he is
“convinced” that the view that concepts are extensional canbe defended (Gl, §68,
fn). He does not there indicate how he thinks the extensional view can be defended, but surely Frege would not have abandoned the much more natural view
that concepts are intensional unless he had acquired theoretical commitments that
conflicted with it. We know of no other view of Frege’s that conflicts with it
than the view that concepts are characteristic functions. So Frege must have held,
already in 1884, that concepts are functions from objects to truth-values.
One might object that there is another explanation for Frege’s change of view,
namely, that he should have adopted an extensional view of functions and that
this is what led him to an extensional view of concepts. And, indeed, it is clear
that the view that concepts are characteristic functions does not by itself entail that
concepts are extensional, since functions themselves might be intensional. But the
view that functions are extensional does not entail that concepts are extensional,
either. For suppose that the conceptual contents Fred has a heart and Fred has a
kidney are distinct, as one would naturally suppose. Then the concept-functions
has a heart and has a kidney map Fred to different conceptual contents, and so
these functions are distinct, even if they are extensional. The right conclusion
to draw, then, is that Frege’s abandonment of the intensional view of concepts
makes sense only if he has committed himself both to an extensional view of
functions and to the treatment of concepts as characteristic functions. It is the
latter commitment that matters here, though we are happy to agree that these same
considerations show that the view that functions are extensional was also in place
by 1884. Whether Frege had always regarded functions as extensional, or whether
this was another shift in his views, is an issue we need not decide here.28,29
28
For what it is worth, we think the story is actually pretty straightforward: So long as Frege
was confusing functions with the expressions that denote them, an intensional treatment would
have been natural; once he had clearly distinguished these, the extensional conception, which is
the one that is true to how mathematicians speak of functions, could emerge.
29 Here is another objection. On the basis of evidence from the Frege Nachlass, Sundholm
argues that “Frege did not have the doctrine of (objectual) truth-values” in 1889 (Sundholm, 2001,
p. 62). And yet we are claiming that Frege held already by 1884 that truth-values were the values
of concept-functions. But we are not claiming that Frege already held in 1884 that truth-values
are objects. As Dummett notes (1991a, ch. 12), the ontological thesis that truth-values are objects
is bound up with the syntactic thesis that sentences are proper names. So it may be that Frege
had not arrived at this view by 1884, either. And there is reason to suppose he hadn’t. There are
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It is a major virtue of Frege’s new view that concepts are characteristic functions that he can now at least start to make good on the critical claim left undefended in Begriffsschrift: that logic, his logic, allows for the derivation of truths
from other truths, not just of formal symbols from other formal symbols. Truth,
that is to say, does at least enter the picture now. But the new view has problems
of its own; it seems not so much to resolve the problem posed by the substitution
puzzle as to make matters worse. On Frege’s earlier view, the content of a name
is an object; the content of a predicate is a function; and the content of a sentence
is the result of applying the function to the object. The new view no longer treats
concept-functions as mapping objects to conceptual contents; instead, conceptfunctions map objects to truth-values. But the general architecture of the view is
unchanged, so much so that it might seem as if what has really changed is Frege’s
conception of what the contents of sentences are. It might seem, in particular, that
his new view is simply that the content of a sentence is its truth-value. But then
it would not just be pairs like “The Evening Star is a planet” and “The Morning
Star is a plant” that had the same content. All true sentences would have the same
content.30
That would be a misunderstanding, to be sure, but we should not dismiss it too
quickly.31 It is, in fact, a misunderstanding Frege discusses explicitly in an important passage from Function and Concept, a passage in which he is introducing
his view that the ‘meaning’ of a sentence is its truth-value:
. . . What ‘22 = 4’ means is the True just as, say, ‘22 ’ means 4.
And ‘22 = 1’ means the False. Accordingly, ‘22 = 4’, ‘2 > 1’, and
‘24 = 42 ’ all mean the same thing, viz. the True. . . . The objection
here suggests itself that ‘22 = 4’ and ‘2 > 1’ nevertheless tell us quite
different things, express quite different thoughts. (FC, op. 13)
significant differences between his statements of the context principle in Die Grundlagen (Gl, p.
x, §62) and in Grundgesetze (Gg, v. I, §29), differences that seem to reflect a change from a view
on which sentences have a privileged position to one on which they are but a kind of proper name.
This has been the subject of much controversy, so we would not want to rest too much upon it. But
it is reasonable to suppose that it took Frege some time fully to adjust his conception of logic to
his new discovery that truth-values are the values of concept-functions. It seems, in fact, to have
taken several years, as a satisfying new philosophy of logic does not seem to have emerged until
sometime in 1889 or 1890, as Sundholm (2001) makes clear. That, we would suggest, is what
accounts for Frege’s long silence between 1885 and 1891.
30 And all false sentences, too, though one different from that of the true sentences.
31 Something like this misunderstanding is what underlies Thau and Caplan’s (2001) argument
that Frege never abandoned the view that identity is a relation between names. We have discussed
their arguments elsewhere (Heck, 2003; May, 2001).
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We are here translating Frege’s German term ‘bedeuten’ (and its cognates) using
the ordinary English equivalent, ‘mean’, as one simply cannot appreciate the force
of the objection Frege is considering if one translates this difficult term any other
way.32 But when we do so translate it, we can see that, in saying that sentences
‘mean’ their truth-values, Frege seems simply to be inviting the misunderstanding
we just mentioned. Sentences cannot ‘mean’ their truth-values, he has his interlocutor say, because otherwise all true sentences would have to “tell us” the same
thing, which they plainly do not.33 So much the worse, then, for the view that the
‘meaning’ of a sentence is its truth-value! But Frege draws a different conclusion:
. . . [L]ikewise ‘24 = 42 ’ and ‘4 × 4 = 42 ’ express different thoughts;
and yet we can replace ‘24 ’ by ‘4 × 4’, since both signs have the same
meaning. Consequently, ‘24 = 42 ’ and ‘4 × 4 = 42 ’ likewise have
the same meaning. We see from this that from sameness of meaning
there does not follow sameness of the thought expressed. If we say
‘the Evening Star is a planet with a shorter period of revolution than
the Earth’, the thought we express is other than in the sentence ‘the
Morning Star is a planet with a shorter period of revolution than the
Earth’; for somebody who does not know that the Morning Star is the
Evening Star might regard the one as true and the other as false. And
yet both sentences must have the same meaning; for it is just a matter of interchange of the words ‘the Evening Star’ and ‘the Morning
Star’, which mean the same thing, i.e., are proper names of the same
heavenly body. (FC, opp. 13–4)
What Frege is doing here is simply applying the lesson he had learned from the
substitution puzzle: We cannot treat concept-functions as functions from objects
to the contents of sentences. The argument is straightforward: If we assume that
‘meaning’ is compositional, so that the ‘meaning’ of a complex expression is determined by the ‘meanings’ of its parts, and if we assume further that the ‘meaning’ of a proper name is its bearer and that the ‘meaning’ of a sentence Fa is
a function34 of the bearer of a, then it follows immediately that ‘24 = 42 ’ and
32
In our own text, we shall use scare-quotes around the term “meaning” so long as we are using
it in the sense of Bedeutung.
33 It is here that the translation in terms of ‘reference’ fails to convey the force of the objection.
The fact that ‘22 = 4’ and ‘2 > 1’ refer to the same thing does not naturally suggest the objection
that they “nevertheless tell us quite different things”.
34 Frege of course held that the ‘meaning’ of F was such a function, and so that the ‘meaning’
of Fa was the result of applying that function to the bearer of a. But the puzzle about substitution
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‘4 × 4 = 42 ’ must have the same ‘meaning’. But this shows no more, according to
Frege, than that sameness of ‘meaning’ does not imply sameness of content; sentences can have the same ‘meaning’ even if they have different contents.35 And
this, in turn, straightforwardly implies that the content of a sentence Fa cannot be
the result of applying the concept-function that is the content of F to the object
that is the content of a. The values of concept-functions, if they are to be the
‘meanings’ of sentences, cannot also be their contents.
Why does this matter? It matters because function–argument analysis was
supposed to be our window onto the structural features of contents that are responsible for their logical properties. There were supposed to be structural relationships between the contents ∀x(x2 > x) and 12 > 1, for example, relationships
that were supposed to have been illuminated by the function–argument analysis:
In particular, the function ξ 2 > ξ was supposed to occur in both of these contents.
And the structural relationship between the contents was supposed to illuminate
an important logical relationship between them. Moreover, the fact that structural
relations between contents can be elaborated by formal features of a ‘conceptual
notation’ was supposed to be what explained why formal argument need not be
merely the transposition of forms but can instead constitute logical inference, the
derivation of truths from truths. So, in abandoning the view that concept-functions
are functions from objects to conceptual contents, Frege is also abandoning the
only understanding he had of the relations between formal features of expressions
and logical features of their associated contents.
To put the point only slightly differently, when Frege abandons the view that
concept-functions map objects to conceptual contents, he is simultaneously abandoning his prior conception of how the content of a sentence is determined by the
contents of its parts. The central lesson of the puzzle about substitution, as we
saw above, was that his early conception of composition was inadequate to explain why (E) and (M) have the (different) contents they do. What Frege needed,
then, was a new conception of how contents compose, and the chief requirement
on the new conception is that it must do what the old one could not: It must yield
an explanation of why (E) and (M), though composed in the same way of parts
that Frege had originally regarded as having the same contents, do not themselves
have the same content.
Contemporary presentations typically treat the substitution puzzle as raising
does not depend upon the view that this function is the ‘meaning’ of F, only upon the assumption
that there is such a function and that it is determined by F.
35 This point was also noted, in a similar connection, by Hugly and Sayward (2000).
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the question how it is possible for (E) and (M) to express different contents.36 This
is undoubtedly an important question, but—and we cannot emphasize this point
strongly enough—it was not the question that bothered Frege. Frege’s question is
more nearly why it is necessary that (E) and (M) should express different contents.
Of course, (E) and (M), qua formal strings, could have the same content, and they
would have the same content if ‘the Evening Star’ and ‘the Morning Star’ had
the same content. But if ‘the Evening Star’ and ‘the Morning Star’ do not have
the same content, then (E) and (M) cannot have the same content, and it is this
conditional that wants explaining.37 Frege’s old view could not explain it. What
Frege needs, then, is a view that will.
In the discussion that follows, we shall several times reject candidate interpretations of Frege’s views about how thoughts compose on the ground that, were
they correct, no explanation of why (E) and (M) have different contents would be
forthcoming. It is therefore essential that this explanatory question should be one
Frege himself takes to be posed by the puzzle about substitution rather than one
we have read into it. That it is Frege’s own concern is confirmed by how Frege
characterizes his solution to the puzzle. Frege’s solution, of course, was first to
insist upon the distinction between thought and truth-value and then to generalize
this distinction, which applies only to sentences, to one that might apply to expressions of any syntactic category, to names, in particular. The generalization is
what we know as the distinction between sense and reference, and it makes its first
explicit appearance in Function and Concept, immediately following the passages
quoted earlier in this section:
‘24 ’ and ‘4 × 4’ certainly have the same reference, i.e., are proper
names of the same number; but they have not the same sense; consequently, ‘24 = 42 ’ and ‘4 × 4 = 42 ’ refer to the same thing, but have
36
To give just one example, at the opening of his book Frege’s Puzzle, Nathan Salmon writes
that the question Frege poses in the famous passage at the beginning of “On Sense and Reference”
is: “How can pa = bq, if true, differ in ‘cognitive value’. . . from pa = aq?” (Salmon, 1986, p.
11, emphasis ours) Salmon reads the passage this way because he, like everyone else, is focused
on the question whether we need to distinguish sense from reference. Frege’s argument that we
should is supposed to be that only then can ‘a = b’ and ‘a = a’ express different thoughts. The
explanatory question we are about to mention never surfaces.
37 Obviously, the problem does not concern just (E) and (M). What is wanted is an explanation
of why, in general, replacing one expression with another that has a different content will change
the content of the whole. It is not enough, therefore, to explain why (E) has the content it does
and to explain why (M) has the content it does and then to note that these contents are different.
(Thanks to Zoltán Gendler Szabó for clarifying this point.)
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not the same sense (i.e., in this case: they do not contain the same
thought). (FC, op. 14, our emphasis)
Note Frege’s use here of the term ‘consequently’,38 which indicates that the sentences he mentions express different thoughts because their parts have different
senses. There is similar language in a letter Frege wrote to Peano in about 1896:
In the proposition ‘The evening star is the same as the evening star’,
we have only [an instance of the principle of identity]; but in the
proposition ‘The evening star is the morning star’ we have something
more.
How can the substitution of one proper name for another designating
the same object effect such changes? One would think that it could
affect only the form and not the content. . . . I say that the two names
have the same reference but not the same sense. . . . And so it happens
that the thought of our first proposition is different from that of the
second; for the thought we express in a proposition is the sense of the
proposition. (PMC, pp. 127–8, our emphasis)
Here again, the claim being made is that the two sentences express different
thoughts because they are composed of expressions that have different senses.39
The substitution puzzle shows, then, that there are two theoretical roles that
must be distinguished, roles that Frege had originally conflated: that of the content of a sentence and that of the value of a concept-function, both of which had
originally been identified with conceptual content. This is why Frege writes in
Grundgesetze that conceptual content “now divides into what I call thought and
what I call truth-value[, as] a consequence of the distinction between the sense
and denotation of a sign” (Gg, v. I, p. x).40 Content henceforth is to be understood
as having two aspects, as being a relation, in the general case, between sense and
38
The German is: und daher haben ‘24 = 42 ’ and ‘4 × 4 = 42 ’ zwar dieselbe Bedeutung, aber
nicht denselben Sinn. . . .
39 The German for the last sentence is: So kommt es, dass der Gedanke unseres ersten Satzes
von dem des zweiten verschieden ist; denn der Gedanke, den wir mit einem Satze ausdrücken, ist
der Sinn dieses Satzes. As Kai Wehmeier pointed out to us, the translation “and so it happens”
probably doesn’t capture the full force of the remark. The phrase “Wie kommt es eigentlich,
dass. . . ” is a natural way in German to begin a question that calls for an explanation. Frege’s
phrase, “So kommt es”, thus suggests that he is answering just such a question. So it would not be
unreasonable to translate the sentence: That is why the thought of our first proposition is different
from that of the second. . . .
40 Frege’s language here obviously suggests that the roles of sentential content and the value of
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reference. The content of a sentence will consist of a thought and its truth-value:
the sense of the sentence and its reference, or, as we put it above, its ‘meaning’.
It is important to keep in mind that Frege does not identify content with either
sense or reference alone. In particular, he does not regard thoughts as conceptual
contents re-labeled. It is not that Frege could not have had a notion of conceptual
content in his new scheme; having truth-values as the values of concept-functions
does not prevent Frege from saying, for example, that the conceptual content of a
sentence is a complex consisting of a function and its arguments. But he does not
go this route, for reasons that shall emerge directly.
3
Thoughts As Compositionally Complex
The problem with which the puzzle about substitution leaves Frege is thus an
explanatory one: We need an explanation of why (E) and (M) have different
contents. With the introduction of the distinction between sense and reference,
this amounts to a call for an explanation of why (E) and (M) express different
thoughts.41 Now, Frege is firmly committed to the principle of compositionality:42
What thoughts (E) and (M) express will be determined by their logico-syntactic
structure and relevant facts about their constituents. But, as we have seen, the
‘relevant facts’ here cannot be limited to facts about reference: We cannot explain
why (E) and (M) express different thoughts simply in terms of facts about the
‘meanings’, or references, of their constituents. So there must be some other feature of the constituents that contributes to determining what thought is expressed.
Let us call this ‘thought determining’ feature of an expression its sense. Then the
sense of an expression is that feature of it that determines, so far as that expression
is concerned, what thoughts are expressed by sentences in which that expression
occurs.
a concept-function had previously been played by a single notion, and that this notion is what has
now split. This, then, is the additional evidence mentioned earlier, in note 21, for our interpretation
of Frege’s early view of these matters: that the values of concept-functions are conceptual contents.
41 There are two ways to think of this. On one, the old question why (E) and (M) have different
contents is no longer of interest, and it has simply been replaced by the new question why they
express different thoughts. If the old question is supposed still to be of interest, on the other
hand, then, since the old notion of content has divided into a new notion of which thought is one
component, it is still sufficient for Frege to show that (E) and (M) express different thoughts.
42 As shall emerge shortly, we think the label ‘compositionality’ is somewhat ill-chosen, if the
thesis it labels is one to the effect that relevant facts about wholes are determined by relevant facts
about their parts. But that is how such principles are known in the literature.
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Frege himself gives a similarly abstract characterization of sense in Grundgesetze:43
The simple or complex names of which a name of a truth-value [that
is, a sentence] consists, contribute to the expression of the thought,
and this contribution of the individual [name] is its sense. (Gg, v. I,
§32)
One might object that this characterization—and, indeed, the way Frege formulates the puzzle about substitution in the first place—assumes without justification
that thoughts are expressed by sentences, that is, that the notion of sense is a linguistic one rather than a merely psychological one. There is, we think, much to
be said about this question, but we cannot pursue it here.44 For present purposes,
it will suffice to note that Frege has a considered view about how languages ought
to be individuated for the purposes of logic, namely: If we are to isolate those
aspects of language that are required if language is to be used in reasoning, then
we must individuate languages not just by their syntax, nor even by syntax plus
reference, but by syntax plus sense. That is, languages are to be individuated with
respect to the relation of expression.
In this respect, then, it is a linguistic fact that (M) expresses a different thought
than does (E). If so, we may indeed characterize the senses of sub-sentential expressions as Frege does in Grundgesetze: The sense of the name ‘the Morning
Star’, for example, is what it “contribute[s] to the expression of the thought” by
such sentences as (M) (Gg, v. I, §32). To be sure, the notion of sense, so characterized, is almost completely programmatic; indeed, it is Frege’s view that in
characterizing sense we can never go any further than elucidating the roles senses
play, since for senses (unlike, say, numbers), no explicit definition is possible.45
But perhaps the notion of sense should simply be left in this programmatic state.
Frege’s remarks in Grundgesetze are obviously in the spirit of his famous ‘context
principle’, which requires us “never to ask for the meaning of a word in isolation,
but only in the context of a proposition” (Gl, p. x), and the context principle has
often been interpreted as licensing one to reject such questions as what the sense
of a name is. We should, the suggestion would be, regard the notion of sense as
a theoretical construct, an abstraction from whatever pattern we might observe in
43 Note that Frege uses the term ‘name’, in Grundgesetze, to mean any well-formed expression,
so the quoted remark applies not just to proper names but to expressions of all types.
44 We have discussed it elsewhere, however (Antonelli and May, 2000; Heck, 2002; May, 2006).
45 In this regard, thoughts are different; they are compositions of senses which refer to truthvalues.
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the thoughts expressed by all of the many sentences that contain a given expression. In the case of ‘the Morning Star’, one such sentence would be (M), and there
would be many other such sentences, too.
There is a serious problem with this sort of holism, however. On this view, it
would be enough for ‘the Morning Star’ and ‘the Evening Star’ to have different
senses that just one appropriate pair of sentences in which they occur should express different thoughts, even if all other such pairs expressed the same thoughts.
It is by no means required that all such pairs should express different thoughts,
so it is not required that (E) and (M) should do so. If the notion of sense were
left in its purely programmatic state, then, we would have no general reason to
suppose that, if ‘the Morning Star’ and ‘the Evening Star’ have different senses,
the particular sentences (E) and (M) must express different thoughts. But then no
explanation of that fact is forthcoming. The more important point, however, is that
the abstractionist view inverts the appropriate order of explanation.46 Frege wants
an explanation of why (E) and (M) express different thoughts. What he wants to
be able to say is that they do so because they contain different parts, that these
parts have different senses, and that the thoughts the sentences express are therefore different. But if the sense of a name simply encapsulates a ‘pattern’ we find
in the thoughts expressed by sentences containing it, then ‘the Morning Star’ and
‘the Evening Star’ only have different senses because these ‘patterns’ are different, that is, because some sentences in which these names occur express different
thoughts. It is not, then, that (E) and (M) express different thoughts because ‘the
Morning Star’ and ‘the Evening Star’ have different senses; rather, ‘the Morning
Star’ and ‘the Evening Star’ have different senses because (E) and (M)—or, at
least, some sentences like them—express different thoughts.
To put the point differently: Frege’s so-called ‘criterion of cognitive significance’—
viz., a and b express different senses if someone could rationally believe that F(a)
but not that F(b)—cannot be used to individuate the senses of sub-sentential constituents, even if the criterion is regarded as proffering a necessary as well as a
sufficient condition for difference of sense.47 That (E) and (M) express differ46
Many people have worried that holistic views are ultimately incompatible with any robust
account of compositionality, e.g., Dummett (1993) and Fodor and Lepore (1992, esp. Ch. 6). We
are expressing a similar concern.
47 There is some controversy on this point. Most of Frege’s applications of the criterion—and
all of his really critical applications of it—depend only upon its being a sufficient condition for
difference of sense. There are times, however, when he seems to use it as a necessary condition.
For example, Frege suggests that ‘A and B’ and ‘B and A’ have the same sense, on the ground that
no-one who understood both could accept one without accepting the other (CT, op. 39). Our view,
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Thoughts As Compositionally Complex
ent thoughts entails that ‘the Morning Star’ and ‘the Evening Star’ have different
senses, but it cannot constitute their having different senses, not if we are to be
able to give the explanation Frege wants.
It is thus essential for Frege’s purposes that he should give the notion of sense
more substantial content. And, as it happens, Frege had resources antecedently
available that would allow him at least to start giving it some. In his discussion of
identity-statements in Begriffsschrift, Frege famously writes:
. . . [T]he need for a sign for identity of content rests upon the following consideration: the same content can be completely determined in
different ways; but that in a particular case two ways of determining
it really yield the same result is the content of a judgement. Before
this judgement can be made, two distinct names, corresponding to the
two ways of determining the content, must be assigned to what these
ways determine. (Bg, §8, Frege’s emphasis)
Or again, Frege writes in Die Grundlagen:
Why is it. . . that we are able to make use of identities with such significant results in such diverse fields? Surely it is. . . because we are
able to recognize something as the same again although it is given in
a different way. (Gl, §67)
The distinction between the object to which a name refers and the way in which
that object is given to us is thus present throughout Frege’s work, from Begriffsschrift to “On Sense and Reference” and beyond. But the way Frege understands
this distinction changes. In Begriffsschrift, Frege regarded the distinction between
an object and how it is given as a distinction between content and something that
is not itself content but only presents content. In his mature work, on the other
hand, Frege regards this same distinction as one within content.48 What gives the
otherwise programmatic notion of sense at least some substance is thus the suggestion that the mode of presentation associated with a name is part of its content
(SM, op. 27). Of course, how much heft is thereby added depends upon how much
we take ourselves to know about ways in which objects may be presented, and,
infamously, Frege says little more directly about the matter. But however desperately one might have wanted him to say more, the crucial question for us is how
however, is that this is just a slip. A more important sort of example is provided by such pairs as
‘a is parallel to b’ and ‘the direction of a is the same as that of b’. We’ll discuss this sort of case
in section 5.
48 This was first pointed out by Angelelli (1967, pp. 38–40).
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the fact that ‘the Morning Star’ and ‘the Evening Star’ are associated with distinct
modes of presentation is supposed to help us to explain why (E) and (M) express
different thoughts. Remember: It was to answer this question that senses were
introduced in the first place.
The temptation here is to invoke a principle of compositionality for senses:
The sense of a sentence is determined by the senses of its parts. But this is insufficient. Certainly, if ‘the Morning Star’ and ‘the Evening Star’ have the same
sense, then the sentences (E) and (M) must also have the same sense. But compositionality, as just stated, simply does not imply that, if ‘the Morning Star’ and
‘the Evening Star’ have different senses, then (E) and (M) will also have different senses. The reference of the whole is also determined by the references of the
parts, but it does not follow from the fact that the reference of ‘Venus’ differs from
that of ‘Mars’ that ‘Venus is a planet’ and ‘Mars is a planet’ must have different
truth-values; it follows only that they might have different truth-values. Similarly
if the sense of a sentence is determined by the senses of its parts, then the fact that
(E) and (M) contain parts with different senses makes it possible that they should
express different thoughts, but it in no way requires that they must.
If this point has been obscured, it is because of the difference highlighted earlier between contemporary approaches to the puzzle about substitution and Frege’s
own reasons for being concerned with it. As we mentioned, contemporary authors
tend to emphasize the question how it is possible for (E) and (M) to express different thoughts. And if that is the question, then the principle that the thought
expressed by a sentence is determined by the senses of its parts shows the way to
an answer: The parts do not have the same senses. But that, we emphasize again,
was not the problem the puzzle posed for Frege. Frege’s problem was to explain
why (E) and (M) express different thoughts. But if that is the question, then invoking compositionality in the form of a supervenience thesis hardly helps at all.
The claim that the sense of a sentence is determined by the senses of its parts is
compatible with the claim that two different compositions of senses should converge on the same thought, just as two different compositions of references may
converge on the same truth-value. But then we have no explanation of why (E)
and (M) express different thoughts.
It follows that senses cannot just be features of expressions that help to determine the thought expressed by sentences containing them. If that were all they
were, then, short of base stipulation, we could not rule out the possibility that
different compositions of senses should determine the same thought. So what we
need, if we are to explain why (E) and (M) express different thoughts, is to earn
a right to that principle: that different compositions of senses must determine dif25
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ferent thoughts. More precisely, what we need in the present context is just the
following special case of that principle: If a and b are expressions with different senses, then substituting b for a in any sentence in which a occurs will, as
Frege puts it in the letter to Peano, “effect” a change in the thought expressed.
And we can earn a right to this principle if we regard compositions of senses in
a more structural light. So suppose that, rather than merely helping to determine
the sense of the whole, the senses of the parts were themselves parts of the sense
of the whole. A thought, on this view, would be a complex, wholly made up
from—that is, composed of—its constituent senses, and so nothing above and beyond their composition. Thoughts, therefore, would be the same only if they were
made up of the same parts, and would be different otherwise. As we observed earlier, Frege expresses just this view in Grundgesetze: “If a name is part of a name
of a truth-value, then the sense of the former is part of the thought expressed by
the latter” (Gg, v. I, §32). But Frege’s most vivid expression of this view is in the
opening remarks of his last published essay, “Compound Thoughts”:
It is astonishing what language can do. With a few syllables, it can
express an incalculable number of thoughts, so that even if a thought
has been grasped by an inhabitant of the Earth for the very first time,
a form of words can be found in which it will be understood by someone else to whom it is entirely new. This would not be possible if we
could not distinguish parts in the thought corresponding to the parts of
a sentence, so that the structure of the sentence can serve as a picture
of the structure of the thought. (CT, op. 36)
For Frege, the structure of language is thus a mirror of the structure of thought.49
Given that ‘the Morning Star’ and ‘the Evening Star’ express different senses,
it will therefore follow that (E) and (M) express different thoughts. Far from
being an affectation, then, Frege’s view that the thought expressed by a sentence
is compositionally complex—its constituent parts being the senses expressed by
the constituent parts of the sentence—is demanded by the structure of his solution
49
One might suggest that a ‘logically perfect’ language would be one in which distinct expressions can never have the same sense—except, perhaps when they are definitionally related. In
that case, we could in principle always detect on purely formal grounds whether two sentences
expressed different thoughts, since any divergence would be detectable, given the definitions. But
Frege’s point here does not require that language mirror thought to such an extent, and no such
claim is needed for our purposes, either. As we mentioned earlier, what needs explaining here is
why (E) and (M) must have different senses if ‘the Morning Star’ and ‘the Evening Star’ have
different senses.
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to his famous puzzle about substitution.50
4
How to Compose a Thought
Unfortunately, it is not at all obvious how to apply mereological notions to thoughts.
Frege himself, following up the remark just quoted, warns that “. . . we really talk
figuratively when we transfer the relation of whole and part to thoughts. . . ” (CT,
op. 36). It is all well and good to say that the sense of ‘The Morning Star is a
planet’ contains the sense of ‘the Morning Star’ and the sense of ‘is a planet’ as
its only parts. But that does not suffice to answer the question how the thought
that the Morning Star is a planet is composed of these parts, for nothing has yet
been said about how the parts are bound together, that is, about how senses cohere to form thoughts. There are some answers that are clear losers. For instance,
thoughts cannot be mere agglomerations (or fusions) of their constituent senses.
This fails with even the simplest cases, since ‘Alex loves Toni’ and ‘Toni loves
Alex’ would then have the same sense. At the very least, it would seem, there has
to be some further structure in thoughts if are going to address the issue how the
parts cohere.
But the mere addition of structure will not be sufficient either, not if thoughts
are to be the sort of things Frege thinks they are. Suppose we were to regard
thoughts as some sort of structured sets. The thought expressed by ‘the Morning
Star is a planet’ might be something like an ordered pair whose first member was
the sense of the name ‘the Morning Star’ and whose second member was the
sense of the predicate ‘ξ is a planet’. The thought that Toni loves Alex would be
something like an ordered triple containing, in order, the senses of ‘Toni’, ‘loves’,
and ‘Alex’, and so would be different from the thought that Alex loves Toni. No
such view can be Frege’s, for no such view can solve the fundamental problem
how senses cohere to form a thought. That problem, as Frege aptly puts it in
discussing a similar idea, is “shifted, but not avoided” by such a treatment (CO,
op. 205). On Frege’s view, thoughts are essentially truth-evaluable, so their truthevaluability must be a consequence of the correct account of what thoughts are. If
thoughts are compositions of senses, therefore, the truth-evaluability of thoughts
50
In a somewhat similar vein, Peter Pagin (2003) has argued that the principle that contents have
constituent structure is required if we are to be able to explain how ordinary speakers manage to
decide what sentence to use to express a given thought. This sort of principle is also related to what
Fodor and Lepore (2002) call ‘reverse compositionality’. There has been a fair bit of discussion
of that principle (Johnson, 2006; Patterson, 2005; Robbins, 2005).
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must be a consequence of how they are composed from senses. Or, to put the
point another way, the question how thoughts are composed of senses will not
have been answered unless it has been shown how, through the composition of
senses, thoughts determine truth-conditions for the sentences that express them.
But this is exactly the issue that the view presently under consideration avoids:
For all that has been said, the ordered pair consisting of the sense of ‘the Morning
Star’ and the sense of ‘ξ is a planet’ might be true if the Morning Star is not
a planet—or, for that matter, if the Morning Star is the only planet, or if it is
one of an odd number of planets. And this issue, one must bear in mind, is not
metaphysical. The issue is not whether there can be structured sets of senses. If
there are senses at all, then presumably there are sets of them. Rather, the problem
is semantic: There is nothing intrinsic to an ordered n-tuple of senses that tells us
under what condition it is true.51
Frege was certainly well aware that there is a problem about how thoughts
cohere, offering the following insight in “On Concept and Object”:52
. . . [N]ot all parts of a thought can be complete; at least one must be
‘unsaturated’ or predicative; otherwise, they would not hold together.
For example, the sense of the phrase ‘the number 2’ does not hold together with that of the expression ‘the concept prime number’ without
a link. (CO, op. 205)
Frege is here contrasting the noun phrase ‘the concept prime number’ with the
verb phrase ‘is a prime number’, whose sense he regards as being appropriately
predicative. What, however, is it supposed to mean that the sense of this verb
51
A possible response at this point would be to hold that “structured thoughts” are not thoughts
at all, but rather representations of thoughts. A semantic theory that associates sentences with
structured thoughts would then not associate sentences with interpretations of those sentences, but
with things that themselves stand in need of interpretation. This, however, would be to step back
from a central aspect of Frege’s view: that thoughts, qua contents, are interpretations, not something subject to interpretation (Antonelli and May, 2000). We might try to ameliorate this failing
by saying that semantic theory is not so much interpretive, but instead translates sentences of one
language into a different language with somewhat peculiar lexical primitives: Rather than words
we might write or pronounce, the lexical primitives of this language are senses, objects, properties, or what have you; but it is, for all that, a language that could, in principle, be interpreted in
different ways. But this would seem to go too far. Theories that associate structured thoughts with
sentences do some semantic work; they associate the lexical primitives of the original language
with their interpretations. But such a theory leaves the job of semantics only half done, and it
leaves the really hard job—that of explaining the nature of semantic composition—completely
undone.
52 Similar remarks can be found in the late essay “Negation” (Neg, op. 155).
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phrase is ‘unsaturated’? Perhaps the most obvious way to understand this claim is
to take the senses of predicates to be unsaturated in the very same way that their
references are: Just as the reference of ‘is a prime number’ is a function, so the
sense of ‘is a prime number’ is a function. And once we have made that move, it is
very natural to suppose that the composition of senses works like the composition
of references: Just as the reference of a sentence is determined by applying the
concept-function that is the reference of a predicate to the object that is the reference of the predicate’s argument, so the sense of a sentence will be determined by
applying the sense-function that is the sense of the predicate to the sense of the
predicate’s argument. The arguments of sense-functions will thus be the senses of
the expressions that fill the argument-places of the associated predicates, and the
value of the function will be the sense of the complex expression constructed from
those parts, that is, the thought the sentence expresses. So the sense of a predicate,
on this view, is a function from the senses of names to thoughts: The sense of ‘is a
planet’, for example, would be the function that maps the sense of ‘Venus’ to the
thought that Venus is a planet; the sense of ‘Sirius’ to the thought that Sirius is a
planet; and so forth.53
The way this interpretation reduces compositionality for senses to functionapplication, in tandem with compositionality for references, is undeniably elegant. But it cannot have been Frege’s view either, for we still have no account
of the connection between composition and truth. Saying that thoughts are the
values of sense-functions in no way explains how the composition of senses determines truth-conditions.54 Certainly no such account falls out of the conception
of how senses compose. All we have been told is that the thought expressed by
‘Venus is a planet’ is some function or other of the sense of ‘Venus’.55 What has
that to do with truth-conditions? But the fatal problem is by now familiar: This
account of how senses compose simply does not solve the problem with which
Frege was concerned; we still cannot explain why (E) and (M) express different
53
This view is strongly identified with Peter Geach (?, pp. 444–5). Dummett (1981, ch 13)
discusses Geach’s view extensively. A more recent proponent is Terence Parsons (1996).
54 A different sort of problem arises from the fact that, on this view, the sense of ‘ξ is a planet’
would be a function from the senses of names to complexes of which that very function was itself
a part. This is not obviously coherent, though perhaps it could be made so.
55 It is extremely important to see that we have not actually been told which function the sense of
‘is a planet’ is. We have been told that it maps the sense of an expression t to the sense expressed
by the sentence ‘t is a planet’. But specifying the function requires saying what its value is for
an arbitrary argument—in this case, an arbitrary sense—not just saying what its value is when an
expression denoting a sense is substituted into the argument-place of some expression that denotes
the function.
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thoughts. If the sense of a predicate is just a function from senses to thoughts,
there is no obvious reason such a function cannot map distinct senses onto the
same thought, just as the reference of a predicate can map distinct objects onto the
same truth-value. So while this proposal may have some advantage over the ones
previously discussed—it is somewhat more explicit, anyway—there has been no
real advance. We could, to be sure, simply stipulate that sense-functions must be
one-to-one, so that different arguments map to different values. But what would
justify that stipulation?
The view that the senses of predicates are functions from senses to thoughts
is an outgrowth, we suggest, of a misreading of Frege’s characterization of sense
in Grundgesetze. He says there that the sense of an expression is that feature of
it that “contribute[s] to the expression of [a] thought” by the various sentences
in which it is contained (Gg, v. I, §32). This clearly implies that the senses of
a sentence’s parts must determine the sense of the whole sentence. But to say
that the sense of a part is what it contributes to the expression of a thought is
to say a good deal more than simply that it helps to determine which thought is
expressed. Frege’s language suggests that the thought expressed by a sentence is
constituted from the contributions made by the sentence’s parts—something that
is also suggested by the common meaning of the term ‘composition’. But if that is
so, then there is an immediate and important consequence for how we understand
the senses of subsentential expressions. In particular, the notion of sense, as it
applies to subsentential expressions, must be no less cognitive than the notion of
thought itself is: If a thought is constituted from what the parts contribute, then
the parts must contribute something from which a thought might be constituted.
Frege tells us directly what this contribution is when he speaks of sense as
mode of presentation. Why, after all, is it even remotely plausible that the fact
that (E) and (M) express different thoughts should follow from the fact that ‘the
Morning Star’ and ‘the Evening Star’ are associated with different modes of presentation? Because the notion of a mode of presentation is a cognitive one. To
entertain the thought that the Morning Star is a planet is to think of a thing given
in one way as a planet; to entertain the thought that the Evening Star is a planet is
to think of a thing given in a different way as a planet. The cognitive difference
between the modes of presentation is simply absorbed into the thoughts, where it
contributes to—or even constitutes—the cognitive difference between them.56
56
On Frege’s view, it is a design feature of Begriffsschrift that formally distinct symbols—
figuren, as he calls them—represent distinct senses. In this regard, consider Frege’s discussion
in “The Thought”, where he suggests distinguishing “Dr. Lauben” from “Gustav Lauben” as a
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4 How to Compose a Thought
Conversely, it is difficult to see how we could possibly explain why (E) and
(M) express different thoughts if we did not suppose that the notion of sense for
sub-sentential expressions was, like the notion of sense for sentences, fundamentally cognitive. Suppose, for example, that we were to take the sense of a primitive
expression to be the complete history of its use or, perhaps, the time and place
where it was first used.57 Since no two primitive expressions can first have been
used at the same time and place, no two primitive expressions could then have the
same sense, and so the sense of a complex expression would trivially be determined by the senses of its primitive parts.58 Such a theory is utterly unsatisfying,
however: That ‘the Morning Star’ and ‘the Evening Star’ have different histories
of use does not by itself explain why the sentences (E) and (M) express different
thoughts but, yet again, only makes it possible that they should. And the same
will be true, we suggest, of any view that identifies the sense of an expression
with some non-cognitive feature of it.
The argument here is by no means limited to names; mutatis mutandis, a similar point applies to the senses of predicates. In the case of sense-functions, the
objection would be this: There is no reason, absent blind stipulation, that different
sense-functions could not map the same argument to the same thought—or, for
that matter, that different sense-functions should not map different arguments to
the same thought. There is nothing in this conception of how thoughts are composed from senses that prevents Fa, Fb, and Gb from all expressing the same
thought, even if F and G, and a and b, have different senses. So if we want an
explanation of why Fb and Gb must express different thoughts if F and G have
different senses, the notion of sense for predicates too must be a cognitive notion.
The senses of predicates, that is to say, must contain modes of presentation of
their references, and so the sense of a predicate must be a way in which a function
from objects to truth-values may be given to us.
What might it mean to say that the sense of a predicate contains a mode of
presentation of its referent? Let us first consider ordinary functional expressions,
propedeutic for making natural languages more perfect (Tht, p. 359, op. 65).
57 We are assuming here that primitive expressions, unlike complex ones, cannot be meaningful
though utterly unused. Whatever the status of that assumption, however, some such trivial account as the one we are considering ought to be possible. Perhaps most trivially, for example, we
could simply take the sense of an expression to be the expression itself, so long as we regarded
ambiguous expressions as actually being distinct though homophonic.
58 It simply won’t be possible to have distinct complexes composed in the same way from parts
with the same senses. So even if all complex expressions had the same sense, we’d still have
compositionality in the form: If you have different senses for the wholes, you have different senses
for the parts. That’s how weak that principle is.
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such as ‘ξ 2 − 1’ and ‘(ξ + 1)(ξ − 1)’. These have the same value for every argument and so have the same reference.59 That they have different senses, however,
is clear from the fact that the statement just made—these functions have the same
value for every argument—is potentially informative, the common value the functions have for a given argument being determined in different ways: In the one
case, we multiply the argument by itself and then subtract one; in the other, we
multiply the result of increasing the argument by one by the result of decreasing it
by one. These two ways of describing a single mapping from arguments to values
correspond to the senses of the two expressions: The sense of a functional expression must encompass a particular way in which values may be associated with
arguments. We might, then, think of the senses of functional expressions as what
are sometimes called ‘functions-in-intension’, that is, as arithmetical functions
individuated intensionally rather than (as is nowadays common) extensionally.
Something like this view seems implicit in one of Dummett’s discussions of
the senses of incomplete expressions:
The condition for the truth of the thought has to be viewed as the satisfaction by a particular object, given in a certain way, of a certain
condition on it. The condition to be satisfied by the object is itself
given in a particular manner, corresponding to the sense of the predicate: but it is a condition on the object, that is, on the referent of the
proper name. . . . [T]he sense of the proper name determines an object
as its referent; and the sense of the predicate determines a mapping
from objects to truth-values, that is to say, a concept; the sentence
is true or false according as the object does or does not fall under the
concept. . . . The mapping of objects on to truth-values is not the sense
of the predicate, but its referent; the sense is, rather, some particular
way, which we can grasp, of determining such a mapping. But the
sense of the predicate is to be thought of, not as being given directly
in terms of a mapping from the senses of proper names on to anything, but, rather, in terms of a mapping of objects on to truth-values.
(Dummett, 1981, pp. 258–9)
59
Frege wouldn’t have been entirely happy with this way of putting the point, since, according to him, one cannot assert an identity between concepts: identity is a first-level relation between objects. What we can do is assert that ∀x[x2 − 1 = (x + 1)(x − 1)], and Frege regards
∀x[Φx = Ψx] as the “second-level relation which corresponds to, but should not be confused with,
equality. . . between objects” (CSM, p. 121). It is, that is to say, the analogue, for one-place firstlevel functions, of identity.
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So the sense of an incomplete expression is a way of presenting a mapping from
objects to truth-values. That, more or less, is what a function-in-intension is supposed to be.
This interpretation retains the idea that the senses of predicates are functions,
but it reconceives what the arguments and values of these functions are. As a
result, it offers an easy answer to the question what ‘completes’ or ‘saturates’
the sense of a functional expression: What completes the sense of a functional
expression is simply an object. It might seem as if that is impossible, since we
would then be unable to distinguish the sense of, say, ‘42 ’ from that of ‘(2 × 2)2 ’,
since in both cases the sense of ‘ξ 2 ’ is completed by the same number. And if the
sense of ‘ξ 2 ’ were a function from objects to senses—from the referent of a term
t to the sense of pt 2 q—then of course the objection would be conclusive. But that
is not the view. The view, rather, is that the sense of a functional expression is an
intensionally individuated function from objects to objects, and when an object is
provided to this function as argument, it must be given to us in some way or other.
What distinguishes the sense of ‘42 ’ from that of ‘(2 × 2)2 ’ is, quite simply, how
the argument is given to us. Suppose, for example, that the sense of ‘4’ presents
4 as the successor of 3. Then the sense expressed by ‘42 ’ may be characterized as
follows: to one who understands the expression ‘42 ’, this expression presents an
object as the number that results if the successor of 3 is multiplied by itself. The
expression ‘(2 × 2)2 ’ presents that same object in a different way, namely, as the
number that results if the successor of one is multiplied by the successor of one
and then this intermediary result is multiplied by itself.
Unfortunately, simply saying that the sense of a functional expression is a
function-in-intension doesn’t help us to understand how the sense of a name and
the sense of a functional expression cohere.60 As just emphasized, a functionin-intension is a function from objects to objects: Given an object as argument,
it delivers an object as value. How, then, do the function-in-intension and the
sense of a name together constitute a new sense?61 Does the function-in-intension
somehow meet the sense of the name at its referent and then, before actually
determining a value, wait just long enough that it and the sense of the name can
together constitute a compositionally complex sense?62 It does not seem likely
60
Thanks to Eli Hirsch for forcing the developments that follow.
Recall Frege’s insistence upon a “link” that holds senses together (CO, op. 205).
62 One might think it would help to say that the sense of a functional expression is completed
by the sense of a name so that the sense of a functional expression is a function from the senses
of names to objects: The sense of ‘ξ 2 ’, for example, would map the sense of ‘4’ to 16; the sense
of ‘3’ to 9; and so forth. But even if that did seem helpful, there are serious problems with this
61
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that any satisfying answer will be forthcoming.
The question we should be asking, however, is not how the sense of a name
and the sense of a predicate cohere to form a thought, as if what were at issue
here were a question about the metaphysics of thoughts. What is at issue here is
no more a question about the metaphysics of thoughts than it is a question about
the psychology of thinking—one that could be solved by appeal to some psychological analogue of predication—and the one temptation is just as dangerous as
the other. The question at issue is semantical: How does the way a sentence is
composed of constituents that express certain senses determine what thought is
expressed by the sentence itself? The question, that is to say, concerns how sentences are interpreted. To stay on the straight and narrow, then, we must occupy
and steadfastly refuse to abandon the semantic perspective that pervades Frege’s
mature writings.
We certainly do not wish to deny, of course, that Frege sometimes uses terms
like ‘unsaturated’ and ‘incomplete’ in a way that suggests a metaphysical interpretation. But when he so speaks, we think Frege is himself straying from the
path. (We must do as he says, not as he does.) Consider, for example, Frege’s
claim that predicates are unsaturated. By way of explanation of this doctrine, one
sometimes hears it said that, according to Frege, predicates have a ‘gap’ in them
that awaits completion by an argument. But what, in metaphysical terms, could it
possibly mean that predicates have a ‘gap’ in them? We have no idea—and Frege
himself warns us that such language is not to be taken literally (CO, op. 205).
Its purpose is to help convey to Frege’s readers what the fundamental difference
between names and predicates is. That is to say, the doctrine that predicates are
unsaturated is not a metaphysical one but a syntactic one, which is precisely what
it ought to be, since it is a claim about what kinds of expressions predicates are:
It is part of what it is for an expression to be a predicate, Frege is saying, that,
in every one of its occurrences, the expression must occur with an appropriate
number of arguments of appropriate types.63 Perhaps we are so tempted to read
suggestion. One is that, if the sense of ‘ξ 2 ’ is a function from senses to objects, then it is not
obvious what completes the sense of ‘ξ 2 ’ in a sentence like: ∃x(x2 = x), the problem being that
variables do not have senses but only values. Perhaps this technical problem could be addressed,
but there is another problem that seems quite fatal: This view leaves it unexplained why the sense
of ‘ξ 2 ’ must map the sense of ‘2 × 2’ to the same thing to which it maps the sense of ‘4’ or, more
generally, why it must map any two senses with the same reference to the same object. That is to
say, this view leaves it unclear why the referent of ‘ξ 2 ’ must be a function from objects to objects,
which is to say that it fails to represent the sense of ‘ξ 2 ’ as a way in which a function from objects
to objects may be given to us.
63 The first appearance of the claim that predicates are unsaturated—or something in the same
34
Richard G. Heck and Robert May
The Composition of Thoughts
4 How to Compose a Thought
metaphysical content into Frege’s pronouncements because this claim is now so
familiar to us: Surely Frege is not just making a simple point of syntax when he
says that predicates are unsaturated! But the claim was not familiar in Frege’s day.
It was revolutionary (Heck and May, 2006, §1.2).
Frege’s claim that concepts (more generally, functions) are unsaturated should
not be understood as a metaphysical thesis either: It is not a claim about the inherent nature of concepts; it is not, in particular, a claim that is independent of
concepts’ role as the interpretations of predicates. We can see this from the way
Frege explains the unsaturatedness of concepts in his mature period.64 What Frege
explains initially is the unsaturatedness of predicates; thus, in opening Grundgesetze with an “Introduction to Function, Concept, Relation”, he tells us first that
“The expression for a function is in need of completion, unsaturated” (Gg, v. I,
§1). Only then does he explain the unsaturatedness of concepts, and he explains
concepts’ unsaturatedness in terms of the unsaturatedness of the expressions that
refer to them: Because a sign for an argument fills the argument place of a sign
for a function, we can say that “The function is completed by the argument. . . ”
(Gg, v. I, §1). In “Comments on Sense and Meaning”, Frege puts it this way:65
. . . [O]ne can always speak of the name of a function as having empty
places, since what fills them does not, strictly speaking, belong to
it.66 Accordingly, I call the function itself unsaturated, or in need of
supplementation, because its name has first to be completed with the
ballpark—is in a passage we quoted earlier, from “Boole’s Logical Calculus”:
A sign for a property never appears without a thing to which it might belong being
at least indicated, a designation of a relation never without indication of the things
which might stand in it. (BLC, p. 17)
That certainly looks like a syntactic doctrine.
64 How Frege understands the relation between the unsaturatedness of expressions and the unsaturatedness of concepts changes as his views on concepts develop. In 1881, Frege seems to
derive the unsaturatedness of predicates from the unsaturatedness of our ideas of what they designate (BLC, p. 17); in 1882, on the other hand, Frege seems to derive this epistemological thesis
from a metaphysical thesis about concepts themselves, and then the unsaturatedness of predicates
emerges as a consequence of one or another of these (PMC, p. 101).
65 There are similar remarks in Function and Concept (FC, opp. 6ff), “On Concept and Object”
(CO, opp. 194–5), and “What Is a Function?” (WF, op. 665), i.e., in almost all of Frege’s mature
discussions of the incompleteness of predicates.
66 Long and White’s translation has “them” here rather than “it”, as if it were anaphoric on
“empty places”. It is clear, however, that what Frege means is, as he puts it in Function and
Concept, that “the argument does not belong with a function” (FC, op. 6).
35
Richard G. Heck and Robert May
The Composition of Thoughts
4 How to Compose a Thought
sign of an argument if we are to obtain a meaning that is complete in
itself. (CSM, p. 119, our emphasis)
But how precisely should we understand the relationship between the fact that
functional expressions are unsaturated and the fact that functions themselves are?
One option would be to regard Frege as simply projecting the unsaturatedness of
predicates onto their referents—and here ‘projecting’ would be used in its pejorative sense. Fortunately, there is an alternative. If the unsaturatedness of predicates
is to have any consequence whatsoever for the nature of what they denote, that
consequence must surely issue from the connection between a predicate and its
denotation, that is, from something about the semantics of predicates. If so, then
just as the claim that predicates are unsaturated is a syntactic thesis, so the claim
that concepts are unsaturated is a semantic thesis. In particular, the claim that
predicates are unsaturated may be understood as a claim about the nature of semantic composition: It is the claim that predication is ‘internal’ to the semantics
of predicates, in the sense that the semantic clause that governs a predicate should
of itself account for how the denotation of the predicate composes with the denotations of its arguments (Heck and May, 2006, §2). As Frege puts it in a letter to
Anton Marty, written in 1882: “. . . [T]he relation of subject to predicate is not a
third thing added to the two, but it belongs to the content of the predicate” (PMC,
p. 101).
Frege’s claim that the senses of predicates are unsaturated can be understood
similarly. Just as the unsaturatedness of concepts is parasitic on the unsaturatedness of the expressions that denote them, so the unsaturatedness of the senses of
predicates is parasitic on the unsaturatedness of their references. The sense of a
predicate is a mode of presentation of a concept: So the sense of a predicate is a
mode of presentation of something that is, of necessity, true or false of objects; it
is a way in which a function from objects to truth-values may be given to us. It
too therefore needs to be completed by an object. The sense of ‘ξ is a planet’,
for example, needs to be completed by an object because it is a way in which a
function from objects to truth-values may be given to us, and that function itself
needs to be completed by an object.
To illustrate, consider our sentence (M), ‘the Morning Star is a planet’. The
sense of the name ‘the Morning Star’ is a mode of presentation of an object. The
sense of the predicate ‘ξ is a planet’ is a way in which a function from objects
to truth-values may be given to us.67 In virtue of how (M) is composed, its truthvalue is the result of applying that function to the referent of ‘the Morning Star’.
67
Of course, a finer analysis would distinguish parts within the predicate, too, recognizing at
36
Richard G. Heck and Robert May
The Composition of Thoughts
4 How to Compose a Thought
To entertain the thought expressed by (M) is thus to think of this truth-value as
being the True: It is, that is to say, to think of an object that is given in a certain
way as being mapped to the True by a function that is given in a certain way.
The thought expressed by (M) is thus, very roughly, that the last celestial body
visible in the morning is mapped to the True by the function that maps all and
only planets to the True. Or much more precisely, albeit much less informatively:
that the Morning Star is a planet. To entertain the thought expressed by (E), on
the other hand, is to think of an object given as the first celestial body visible in
the evening as being mapped to the True by the function that maps all and only
planets to the True. The thought expressed is thus: that the Evening Star is a
planet. The sentences (E) and (M) therefore express different thoughts, and they
do so for just the reason Frege says, namely, that they are composed of parts with
different senses.
We can now see why there is no need for any ‘sense-glue’ to bind the parts of
a thought together—or, less metaphorically, why we do not need any independent
account of how senses compose. On Frege’s view, the parts of a thought are bound
together by the interaction of two more fundamental forces: The determination of
reference by sense, and the composition of references. The parts of thoughts ‘stick
together’ because words that express senses combine, in ways determined by their
formal properties, to form sentences that have truth-conditions, as determined by
the composition of the references that the senses determine. Thoughts are coherently organized not because there is some organizing principle that binds the
senses themselves together, but because senses are related to references that compose via function-application. And it is because thoughts are structured in this
way that, absent reference-failure,68 a thought must have one of the two truthleast the tense as another component. So something like a mode of presentation of the present
would also enter. How such context-dependence is to be handled in a broadly Fregean framework
is a very difficult question: For discussion, see the papers by McDowell (1977), Kaplan (1989),
Perry (1993), Burge (2005), Evans (1985), Heck (2002), and May (2006), among many others.
68 One nice feature of our reconstruction is that it explains why Frege was so ambivalent about
sentences containing non-referring expressions. On the one hand, Frege insists in “On Sense and
Reference” that such a sentence may express a thought even though it contains a name that does
not refer to anything (SM, opp. 32–3). On the other hand, however, as Evans emphasized, Frege
elsewhere seems to regard such sentences as not really expressing thoughts, or as not expressing
real thoughts but only “mock thoughts” (Evans, 1985, pp. 297ff). If, as we have suggested, the
composition of senses is mediated in part by their relation to their references, then it becomes
extremely natural to regard sentences containing parts without reference as exhibiting a grave
semantic defect: Even if the parts of the sentence do have senses, the parts of the thought will not
hold together in the right way if they do not also have references.
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Richard G. Heck and Robert May
The Composition of Thoughts
5 Trouble in Paradise?
values, and the senses of the parts, through how they determine the references of
the parts, will determine under what condition that value will be the True. That
is to say, the familiar Fregean doctrines that thoughts are truth-evaluable and that
they determine truth-conditions emerge, on our interpretation, as consequences
of deep features of Frege’s conception of how thoughts cohere, of how they are
composed from senses.69
The same cannot be said for the view that the senses of predicates are functions
from senses to thoughts. Although nothing in that view precludes thoughts from
being truth-evaluable, it will be impossible to characterize sense-functions absent
an antecedent conception of what thoughts are if thoughts are the values of such
functions (Dummett, 1981, ch. 13). There will then be no alternative to taking it
as axiomatic that thoughts are truth-evaluable and determine truth-conditions, and
so these facts will be left unexplained.
5
Trouble in Paradise?
The advantages bestowed by Frege’s considered conception of content are as obvious as they are profound. But there are also signficant drawbacks to the view,
and there is one we must mention before closing. In various places, Frege speaks
of contents’ being ‘carved’.70 For instance, in a famous passage in Die Grundlagen, Frege suggests that we can reconceive parallelism as an identity and so regard
directions as being what parallel lines have in common. In doing so, “We carve up
the content in a way different from the original, and this yields us a new concept”
(Gl, §64). This idea is arguably central to Frege’s position in Die Grundlagen.
It emerges in the course of his attempt to use the context principle to justify the
introduction of names of directions and, analogously, of numbers.
One advantage of the conception of content with which Frege worked in Begriffsschrift is that it made such claims intelligible. Indeed, it is actually possible
to assert within the formal language of Begriffsschrift that distinct sentences have
the very same conceptual content, which they will therefore ‘carve’ logically in
different ways: That p and q have the same conceptual content is the official sig69
On this view, the connection between the coherence of thoughts and truth-conditions is intimate; it is, as we have mentioned, a consequence of the account of how senses cohere that thoughts
express truth-conditions. This contrasts with much current thinking, which takes coherence and
truth-conditions to be distinct matters. The potential implications for contemporary semantics will
be clear to initiates, but this matter will have to be deferred to a sequel.
70 We are not the first to discuss the tension that will shortly emerge. It is is also discussed by
Dummett (1991b), Hale (2001a), and May (2001), among others.
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Richard G. Heck and Robert May
The Composition of Thoughts
5 Trouble in Paradise?
nificance of ‘p ≡ q’. With Frege’s mature view of content, however, it is no longer
possible for him to make any such claim; the equivalence relations that he now has
available are either too strong or too weak. Consider the two statements ‘a k b’ and
‘dir(a) = dir(b)’. It is certainly true that the two sentences will have the same reference. But saying that these sentences have the same ‘content’, which they carve
differently, cannot be understood in those terms. If that’s all it takes, then ‘a k a’
and ‘Snow is white’ have the same content, too, which they carve differently.
The other option would be to say that ‘a k b’ and ‘dir(a) = dir(b)’ express
the same thought yet carve it differently. But these two sentences cannot express
the same thought. This is not just because they have different parts. We cannot
simply say that sentences that have parts with different senses must express different thoughts and leave it at that. For one thing, that would ignore the fact that
the notion of ‘same sentence’ that is wanted here is not the everyday one but one
that is to be reconstructed in light of a sophisticated conception of logical structure. But more fundamentally, it would commit a simple fallacy, comparable to
claiming that a single object cannot be composed of different parts: If an object
is composed of parts, then it is also composed of the parts of those parts. And
so, in this case, one might insist that ‘ξ k η ’ and ‘dir(ξ ) = dir(η )’ have the same
sense because they are, ultimately, composed of the same parts.71 But while this
move is, in principle, consistent with Frege’s conception of how senses compose,
it conflicts with other of his commitments. The only way we can see to implement
the proposal is to construe it as a suggestion that parallelism should be analyzed
in terms of sameness of direction. But this is something Frege explicitly denies
on the ground that “everything geometrical must originally be given in intuition”
(Gl, §64). Parallelism is supposed to be the more fundamental notion.
Frege has of course abandoned such ‘abstractive’ definitions by the time he
71
This is why the fact that thoughts can be decomposed in different ways does not threaten
the thesis that thoughts have a unique best decomposition. Different decompositions of e.g. ‘Bill
loves Sue’ may simply represent different ways of ‘grouping’ the parts of that thought. The best
decomposition is then just the one that articulates the structure of the thought most completely.
The textual evidence that Frege would have denied this in his mature period is weak. Textor
(2009, p. 113), for example, cites Frege’s remark that “The thought itself does not determine what
is to be regarded as subject” (CO, op. 199). But we see no reason to suppose that, for Frege,
fully articulating a thought’s stucture would require specifying its ‘subject’ and so regard Textor’s
attempt to resolve the resulting tension as unnecessary. That said, it is to Textor’s credit that,
unlike most who have discussed these issues, he clearly appreciates the difference between cases
involving grammatical transformations and the sorts of cases we are discussing in the main text.
Our point, in effect, is just that neither the ‘different groupings’ idea nor anything else one might
reasonably say about passivization and the like can help with Law V.
39
Richard G. Heck and Robert May
The Composition of Thoughts
5 Trouble in Paradise?
writes Grundgesetze. But a similar problem arises nonetheless, and we can still
find him making similar remarks, even in his mature writings. When explaining
the notion of a value-range in Function and Concept, for example, Frege says
that ‘έ (ε 2 − 4ε ) = ά (α (α − 4))’ and ‘∀x[x2 − 4x = x(x − 4)]’ “express[] the same
sense, but in. . . different way[s]” (FC, op. 11). It is hard to be sure just what
Frege has in mind here.72 Surely “the fundamental law of logic that permits the
transformation of an equality holding generally into an equation” between valueranges (Gg, v. II, §147) is not to be compared to a grammatical transformation,
like passivization: ‘έ (ε 2 − 4ε ) = ά (α (α − 4))’ and ‘∀x[x2 − 4x = x(x − 4)]’ are
not related in the way “John saw Mary” and “Mary was seen by John” are.73
Another proposal would be analogous to the one about directions and parallelism
that we just discussed: Take the second-level functional expressions ‘∀x(Ξx =
Φx)’ and ‘έ (Ξε ) = έ (Φε )’ to have the same sense. But then, as in the previous
case, there seems to be only one way to implement the proposal: to claim that
the co-extensiveness of functions should be analyzed in terms of identity of valueranges. But this conflicts with Frege’s well-known (and distinctive) insistence that
concepts are prior to extensions (Gg, v. I, pp. 1–4).
In other places, Frege expresses a somewhat different view. In “Comments
on Sense and Meaning”, written but a few years after Function and Concept, he
insists that ”. . . the reference and not the sense of words [is] the essential thing for
logic. . . . [T]he laws of logic are first and foremost laws in the realm of reference
72
As we remarked earlier in note 47, some commentators regard Frege’s ‘criterion of cognitive significance’ as expressing a necessary as well as a sufficient condition for the distinctness of
thoughts. If so, then the mentioned formulae express different senses only if one could rationally
believe one but not the other, and that, it is said, is impossible. But Frege articulates the criterion
as a necessary condition only once in his mature writings (BSLD, p. 197), and that is in an unpublished fragment. Moreover, Frege is clearly aware that the criterion threatens to imply that all
of the Basic Laws of the Begriffsschrift express the same thought; if that weren’t bad enough, a
Sorities-like argument then threatens to imply that all the theorems do, too. As Rumfitt (1994, pp.
608–9) notes, Frege’s attempt to prevent these consequences is not just ad hoc but insufficiently
general. We suspect that is why the necessary condition does not appear in the Logical Investigations, of which the fragment in question is an early antecedent. Frege is only using it to distinguish
sense from tone, or coloring, and there are better ways to do that.
73 In effect, this is the view of Hans Sluga, who maintains that “a thought concerning a function
is the same as one concerning a value-range” (Sluga, 1980, p. 157), so that Basic Law V will be
analytic. But this view owes an account of the ‘grammar’ of such statements that would make
the structural relation between them clear, as transformational grammars tried to account for passivization. We need to be told how “. . . analysing what is on one side. . . we obtain what is on the
other side. . . ” (Sluga, 1980, p. 156). But then this sort of view has the same obligations as the one
we are about to discuss.
40
Richard G. Heck and Robert May
The Composition of Thoughts
5 Trouble in Paradise?
and only relate indirectly to sense” (CSM, p. 122). So far as the correctness of
proofs is concerned, this is clearly right. If Basic Law V were true, then any
thought correctly inferred from it would also be true: It does not matter, so far as
the truth of the theorems of Grundgesetze are concerned, whether the two sides of
Basic Law V have the same sense, or are true in the same ‘circumstances’, or what
have you. But if our concern is to show that the laws of arithmetic are themselves
laws of logic, that they can be proven from logical laws and definitions—and this,
of course, was precisely Frege’s concern—then the question whether Basic Law
V is itself a law of logic cannot be indefinitely postponed. And then the mere truth
of Basic Law V, which is all the material equivalence of its two sides guarantees,
is insufficient (Heck, 2007; May, 2001). What Frege seems to need, but does not
have, is some intermediate equivalence, one that would follow from identity of
sense, entail identity of reference, and be sufficient for analyticity.
The problem, then, is that, by Frege’s lights, thoughts themselves cannot be
carved in different ways. Rather, if such talk makes any sense at all, thoughts are
what carve content—“content” here being something like the realm of reference,
that is, reality—and the problem is precisely that Frege lacks the theoretical machinery even to make such a remark. Lacking such machinery, it is not surprising
that Frege should say in Function and Concept that the two sides of Law V express the same thought; it’s the best he can do with what he has. But we doubt that
this was ever Frege’s considered view, and we know of nowhere besides Function
and Concept that he makes this claim.74
Ultimately, then, Frege has no justification for his claim that Basic Law V
expresses a basic law of logic. He can insist that he “hold[s] that it purely logical”
(Gg, v. I, p. vii), but he has nothing substantial to say to someone who holds
otherwise.75
74
And just a few years later, when one might have expected him to repeat it, he doesn’t. In
“Comments on Sense and Meaning” (CSM, p. 121), Frege speaks of these two expressions
∀x[(x2 = 1) = ((x + 1)2 = 2(x + 1))]
α
(α 2 + 1) ≍ ((α + 1)2 = 2(α + 1))
as having the same sense, where the latter is effectively defined in terms of the former. By way of
comparison, he also mentions
έ(ε 2 = 1) = ά((α + 1)2 = 2(α + 1)),
but he does not say or imply that it has the same sense as the other two.
75 Frege’s main independent criterion for a proposition’s being a primitive law of logic is that is
41
Richard G. Heck and Robert May
6
The Composition of Thoughts
6 Closing
Closing
Before arriving at the sense–reference distinction as his stable take on content,
Frege held a view that differed in important respects. Frege’s initial position, at
the time of Begriffsschrift, was that we have a window on logical structure because we grasp a linguistic system—the conceptual notation—that represents just
this structure. This approach, however, was seen to be wanting, ultimately because
it could not support a notion of truth. And even though this could be ameliorated
by an articulation of logical properties as integral to the content represented by
Begriffsschrift, this too was unstable. Although a substantive notion of truth does
become available with the notion of an object’s falling under a concept, the substitution puzzle dooms Frege’s earliest account of how the contents of sentences
are determined by the contents of their parts. As a result, Frege developed a view
that changed the cognitive locus. Now, it is thoughts that we grasp, and it is
through this grasp of thoughts that we have access to logical structure. Content is
re-conceptualized as a relation between sense and reference: sense determines reference. Language, in turn, remains representational, but, unlike on the prior view,
only indirectly so: Language represents content only by expressing sense, so that
the way a sentence is composed of words mirrors the way a thought is composed
of senses: “The world of thoughts has a model in the world of sentences, expressions, words, signs” (Neg, op. 148). And with this insight, Frege can now bring
into alignment the formal and logical notions of structure, so as to make possible
an explanation of how true contents follow from other true contents. Because the
sentences of Begriffsschrift express thoughts, and because the rules of the Begriffsschrift have been so formulated that, “if in accordance with them a sentence is
derived from true sentences, the new sentence will also be true” (Gg, II §104),
formal derivations in the Begriffsschrift are not just of symbols from symbols but
of true thoughts from true thoughts.
As we mentioned at the outset, the relations between truth, content, and conceptual structure are critical to Frege’s philosophy: Explicating these relationships is precisely what is required for Frege to reconcile the formal character of
his logical system with his insistence that sentences of Begriffsschrift are not just
empty forms but vehicles of content. And that observation is what allows us finally, we think, to understand why “On Sense and Reference” is no mere diversion
should be self-evident. The question what precisely Frege means by self-evidence has been much
discused of late (Jeshion, 2001; ?). The central idea behind this work is that Frege might have
thought Law V self-evident even if it is not evident to us (Gg, v. I, p. vii; v. II, p. 253). But as
Stewart Shapiro (2009) emphasizes, that is not something it is easy to understand.
42
Richard G. Heck and Robert May
The Composition of Thoughts
References
from Frege’s central project.76 What we have seen is that the distinction between
sense and reference emerges within, not alongside, the development of the logicist
project. It emerges because Frege’s famous puzzles about substitution threaten his
understanding of the formal character of logic: his understanding of how the logical properties of contents might be mirrored in the signs that express them. That is
what forces Frege to revise his early views about how sentences express contents,
and it is this revision that leads to the distinction between sense and reference.77
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