Hilbert's Nullstellensatz

In mathematics, Hilbert's Nullstellensatz (German for "theorem of zeros", or more literally, "zero-locus-theorem") is a theorem that establishes a fundamental relationship between geometry and algebra. This relationship is the basis of algebraic geometry. It relates algebraic sets to ideals in polynomial rings over algebraically closed fields. This relationship was discovered by David Hilbert, who proved the Nullstellensatz in his second major paper on invariant theory in 1893 (following his seminal 1890 paper in which he proved Hilbert's basis theorem).

Formulation

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Let   be a field (such as the rational numbers) and   be an algebraically closed field extension of   (such as the complex numbers). Consider the polynomial ring   and let   be an ideal in this ring. The algebraic set   defined by this ideal consists of all  -tuples   in   such that   for all   in  . Hilbert's Nullstellensatz states that if p is some polynomial in   that vanishes on the algebraic set  , i.e.   for all   in  , then there exists a natural number   such that   is in  .[1]

An immediate corollary is the weak Nullstellensatz: The ideal   contains 1 if and only if the polynomials in I do not have any common zeros in Kn. The weak Nullstellensatz may also be formulated as follows: if I is a proper ideal in   then V(I) cannot be empty, i.e. there exists a common zero for all the polynomials in the ideal in every algebraically closed extension of k. This is the reason for the name of the theorem, the full version of which can be proved easily from the 'weak' form using the Rabinowitsch trick. The assumption of considering common zeros in an algebraically closed field is essential here; for example, the elements of the proper ideal (X2 + 1) in   do not have a common zero in  

With the notation common in algebraic geometry, the Nullstellensatz can also be formulated as

 

for every ideal J. Here,   denotes the radical of J and I(U) is the ideal of all polynomials that vanish on the set U.

In this way, taking   we obtain an order-reversing bijective correspondence between the algebraic sets in Kn and the radical ideals of   In fact, more generally, one has a Galois connection between subsets of the space and subsets of the algebra, where "Zariski closure" and "radical of the ideal generated" are the closure operators.

As a particular example, consider a point  . Then  . More generally,

 

Conversely, every maximal ideal of the polynomial ring   (note that   is algebraically closed) is of the form   for some  .

As another example, an algebraic subset W in Kn is irreducible (in the Zariski topology) if and only if   is a prime ideal.

Proofs

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There are many known proofs of the theorem. Some are non-constructive, such as the first one. Others are constructive, as based on algorithms for expressing 1 or pr as a linear combination of the generators of the ideal.

Using Zariski's lemma

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Zariski's lemma asserts that if a field is finitely generated as an associative algebra over a field k, then it is a finite field extension of k (that is, it is also finitely generated as a vector space).

Here is a sketch of a proof using this lemma.[2]

Let   (k algebraically closed field), I an ideal of A, and V the common zeros of I in  . Clearly,  . Let  . Then   for some prime ideal   in A. Let   and   a maximal ideal in  . By Zariski's lemma,   is a finite extension of k; thus, is k since k is algebraically closed. Let   be the images of   under the natural map   passing through  . It follows that   and  .

Using resultants

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The following constructive proof of the weak form is one of the oldest proofs (the strong form results from the Rabinowitsch trick, which is also constructive).

The resultant of two polynomials depending on a variable x and other variables is a polynomial in the other variables that is in the ideal generated by the two polynomials, and has the following properties: if one of the polynomials is monic in x, every zero (in the other variables) of the resultant may be extended into a common zero of the two polynomials.

The proof is as follows.

If the ideal is principal, generated by a non-constant polynomial p that depends on x, one chooses arbitrary values for the other variables. The fundamental theorem of algebra asserts that this choice can be extended to a zero of p.

In the case of several polynomials   a linear change of variables allows to suppose that   is monic in the first variable x. Then, one introduces   new variables   and one considers the resultant

 

As R is in the ideal generated by   the same is true for the coefficients in R of the monomials in   So, if 1 is in the ideal generated by these coefficients, it is also in the ideal generated by   On the other hand, if these coefficients have a common zero, this zero can be extended to a common zero of   by the above property of the resultant.

This proves the weak Nullstellensatz by induction on the number of variables.

Using Gröbner bases

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A Gröbner basis is an algorithmic concept that was introduced in 1973 by Bruno Buchberger. It is presently fundamental in computational geometry. A Gröbner basis is a special generating set of an ideal from which most properties of the ideal can easily be extracted. Those that are related to the Nullstellensatz are the following:

  • An ideal contains 1 if and only if its reduced Gröbner basis (for any monomial ordering) is 1.
  • The number of the common zeros of the polynomials in a Gröbner basis is strongly related to the number of monomials that are irreducibles by the basis. Namely, the number of common zeros is infinite if and only if the same is true for the irreducible monomials; if the two numbers are finite, the number of irreducible monomials equals the numbers of zeros (in an algebraically closed field), counted with multiplicities.
  • With a lexicographic monomial order, the common zeros can be computed by solving iteratively univariate polynomials (this is not used in practice since one knows better algorithms).
  • Strong Nullstellensatz: a power of p belongs to an ideal I if and only the saturation of I by p produces the Gröbner basis 1. Thus, the strong Nullstellensatz results almost immediately from the definition of the saturation.

Generalizations

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The Nullstellensatz is subsumed by a systematic development of the theory of Jacobson rings, which are those rings in which every radical ideal is an intersection of maximal ideals. Given Zariski's lemma, proving the Nullstellensatz amounts to showing that if k is a field, then every finitely generated k-algebra R (necessarily of the form  ) is Jacobson. More generally, one has the following theorem:

Let   be a Jacobson ring. If   is a finitely generated R-algebra, then   is a Jacobson ring. Furthermore, if   is a maximal ideal, then   is a maximal ideal of  , and   is a finite extension of  .[3]

Other generalizations proceed from viewing the Nullstellensatz in scheme-theoretic terms as saying that for any field k and nonzero finitely generated k-algebra R, the morphism   admits a section étale-locally (equivalently, after base change along   for some finite field extension  ). In this vein, one has the following theorem:

Any faithfully flat morphism of schemes   locally of finite presentation admits a quasi-section, in the sense that there exists a faithfully flat and locally quasi-finite morphism   locally of finite presentation such that the base change   of   along   admits a section.[4] Moreover, if   is quasi-compact (resp. quasi-compact and quasi-separated), then one may take   to be affine (resp.   affine and   quasi-finite), and if   is smooth surjective, then one may take   to be étale.[5]

Serge Lang gave an extension of the Nullstellensatz to the case of infinitely many generators:

Let   be an infinite cardinal and let   be an algebraically closed field whose transcendence degree over its prime subfield is strictly greater than  . Then for any set   of cardinality  , the polynomial ring   satisfies the Nullstellensatz, i.e., for any ideal   we have that  .[6]

Effective Nullstellensatz

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In all of its variants, Hilbert's Nullstellensatz asserts that some polynomial g belongs or not to an ideal generated, say, by f1, ..., fk; we have g = f r in the strong version, g = 1 in the weak form. This means the existence or the non-existence of polynomials g1, ..., gk such that g = f1g1 + ... + fkgk. The usual proofs of the Nullstellensatz are not constructive, non-effective, in the sense that they do not give any way to compute the gi.

It is thus a rather natural question to ask if there is an effective way to compute the gi (and the exponent r in the strong form) or to prove that they do not exist. To solve this problem, it suffices to provide an upper bound on the total degree of the gi: such a bound reduces the problem to a finite system of linear equations that may be solved by usual linear algebra techniques. Any such upper bound is called an effective Nullstellensatz.

A related problem is the ideal membership problem, which consists in testing if a polynomial belongs to an ideal. For this problem also, a solution is provided by an upper bound on the degree of the gi. A general solution of the ideal membership problem provides an effective Nullstellensatz, at least for the weak form.

In 1925, Grete Hermann gave an upper bound for ideal membership problem that is doubly exponential in the number of variables. In 1982 Mayr and Meyer gave an example where the gi have a degree that is at least double exponential, showing that every general upper bound for the ideal membership problem is doubly exponential in the number of variables.

Since most mathematicians at the time assumed the effective Nullstellensatz was at least as hard as ideal membership, few mathematicians sought a bound better than double-exponential. In 1987, however, W. Dale Brownawell gave an upper bound for the effective Nullstellensatz that is simply exponential in the number of variables.[7] Brownawell's proof relied on analytic techniques valid only in characteristic 0, but, one year later, János Kollár gave a purely algebraic proof, valid in any characteristic, of a slightly better bound.

In the case of the weak Nullstellensatz, Kollár's bound is the following:[8]

Let f1, ..., fs be polynomials in n ≥ 2 variables, of total degree d1 ≥ ... ≥ ds. If there exist polynomials gi such that f1g1 + ... + fsgs = 1, then they can be chosen such that
 
This bound is optimal if all the degrees are greater than 2.

If d is the maximum of the degrees of the fi, this bound may be simplified to

 

An improvement due to M. Sombra is[9]

 

His bound improves Kollár's as soon as at least two of the degrees that are involved are lower than 3.

Projective Nullstellensatz

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We can formulate a certain correspondence between homogeneous ideals of polynomials and algebraic subsets of a projective space, called the projective Nullstellensatz, that is analogous to the affine one. To do that, we introduce some notations. Let   The homogeneous ideal,

 

is called the maximal homogeneous ideal (see also irrelevant ideal). As in the affine case, we let: for a subset   and a homogeneous ideal I of R,

 

By   we mean: for every homogeneous coordinates   of a point of S we have  . This implies that the homogeneous components of f are also zero on S and thus that   is a homogeneous ideal. Equivalently,   is the homogeneous ideal generated by homogeneous polynomials f that vanish on S. Now, for any homogeneous ideal  , by the usual Nullstellensatz, we have:

 

and so, like in the affine case, we have:[10]

There exists an order-reversing one-to-one correspondence between proper homogeneous radical ideals of R and subsets of   of the form   The correspondence is given by   and  

Analytic Nullstellensatz (Rückert’s Nullstellensatz)

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The Nullstellensatz also holds for the germs of holomorphic functions at a point of complex n-space   Precisely, for each open subset   let   denote the ring of holomorphic functions on U; then   is a sheaf on   The stalk   at, say, the origin can be shown to be a Noetherian local ring that is a unique factorization domain.

If   is a germ represented by a holomorphic function  , then let   be the equivalence class of the set

 

where two subsets   are considered equivalent if   for some neighborhood U of 0. Note   is independent of a choice of the representative   For each ideal   let   denote   for some generators   of I. It is well-defined; i.e., is independent of a choice of the generators.

For each subset  , let

 

It is easy to see that   is an ideal of   and that   if   in the sense discussed above.

The analytic Nullstellensatz then states:[11] for each ideal  ,

 

where the left-hand side is the radical of I.

See also

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Notes

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  1. ^ Zariski–Samuel, Ch. VII, Theorem 14.
  2. ^ Atiyah–Macdonald, Ch. 7.
  3. ^ Emerton, Matthew. "Jacobson rings" (PDF). Archived (PDF) from the original on 2022-07-25.
  4. ^ EGA §IV.17.16.2.
  5. ^ EGA §IV.17.16.3(ii).
  6. ^ Lang, Serge (1952). "Hilbert's Nullstellensatz in Infinite-Dimensional Space". Proc. Am. Math. Soc. 3 (3): 407–410. doi:10.2307/2031893. JSTOR 2031893.
  7. ^ Brownawell, W. Dale (1987), "Bounds for the degrees in the Nullstellensatz", Ann. of Math., 126 (3): 577–591, doi:10.2307/1971361, JSTOR 1971361, MR 0916719
  8. ^ Kollár, János (1988), "Sharp Effective Nullstellensatz" (PDF), Journal of the American Mathematical Society, 1 (4): 963–975, doi:10.2307/1990996, JSTOR 1990996, MR 0944576, archived from the original (PDF) on 2014-03-03, retrieved 2012-10-14
  9. ^ Sombra, Martín (1999), "A Sparse Effective Nullstellensatz", Advances in Applied Mathematics, 22 (2): 271–295, arXiv:alg-geom/9710003, doi:10.1006/aama.1998.0633, MR 1659402, S2CID 119726673
  10. ^ This formulation comes from Milne, Algebraic geometry [1] and differs from Hartshorne 1977, Ch. I, Exercise 2.4
  11. ^ Huybrechts, Proposition 1.1.29.

References

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