We study the limiting behavior of the zeros of the Euler polynomials. When linearly scaled, they ... more We study the limiting behavior of the zeros of the Euler polynomials. When linearly scaled, they approach a definite curve in the complex plane related to the Szegö curve which governs the behavior of the roots of the Taylor polynomials associated to the exponential function. Further, under a conformal transformation, the scaled zeros are uniformly distributed.
This paper introduces the truncator map as a dynamical system on the space of configurations of a... more This paper introduces the truncator map as a dynamical system on the space of configurations of an interacting particle system. We represent the symbolic dynamics generated by this system as a non-commutative algebra and classify its periodic orbits using properties of endomorphisms of the resulting algebraic structure. A stochastic model is constructed on these endomorphisms, which leads to the classification of the distribution of periodic orbits for random truncator maps.
Abstract: Let $ p_n $ be the number of partitions of an integer $ n $. For each of the partition ... more Abstract: Let $ p_n $ be the number of partitions of an integer $ n $. For each of the partition statistics of counting their parts, ranks, or cranks, there is a natural family of integer polynomials. We investigate their asymptotics and the limiting behavior of their zeros as sets and densities.
Abstract: Increased day-trading activity and the subsequent jump in intraday volatility and tradi... more Abstract: Increased day-trading activity and the subsequent jump in intraday volatility and trading volume fluctuations has raised considerable interest in models for financial market microstructure. We investigate the random transitions between two phases of an agent-based spin market model on a random network. The objective of the agents is to balance their desire to belong to the global minority and simultaneously to the local majority.
Abstract: Let $ F_n (x) $ be the partition polynomial $\ sum_ {k= 1}^ n p_k (n) x^ k $ where $ p_... more Abstract: Let $ F_n (x) $ be the partition polynomial $\ sum_ {k= 1}^ n p_k (n) x^ k $ where $ p_k (n) $ is the number of partitions of $ n $ with $ k $ parts. We emphasize the computational experiments using degrees up to $70,000 $ to discover the asymptotics of these polynomials. Surprisingly, the asymptotics of $ F_n (x) $ have two scales of orders $ n $ and $\ sqrt {n} $ and in three different regimes inside the unit disk. Consequently, the zeros converge to network of curves inside the unit disk given in terms of the dilogarithm.
We begin by classifying all solutions of two natural recurrences that Bernstein polynomials satis... more We begin by classifying all solutions of two natural recurrences that Bernstein polynomials satisfy. The first scheme gives a natural characterization of Stancu polynomials. In Section 2, we identify the Bernstein polynomials as coefficients in the generating function for the elementary symmetric functions, which gives a new proof of total positivity for Bernstein polynomials, by identifying the required determinants as Schur functions.
Abstract: In this short note we investigate the natur of the phase transitions in a spin market m... more Abstract: In this short note we investigate the natur of the phase transitions in a spin market model as a function of the interaction strength between local and global effects. We find that the stochastic dynamics of this stylized market model exhibit a periodicity whose dependence on the coupling constant in the Ising-like Hamiltonian is robust to changes in the temperature and the size of the market.
ABSTRACT. Let pn be the number of partitions of an integer n. For each of the partition statistic... more ABSTRACT. Let pn be the number of partitions of an integer n. For each of the partition statistics of counting their parts, ranks, or cranks, there is a natural family of integer polynomials. We investigate their asymptotics and the limiting behavior of their zeros as sets and densities.
Abstract: General semifinite factor representations of the diffeomorphism group of euclidean spac... more Abstract: General semifinite factor representations of the diffeomorphism group of euclidean space are constructed by means of a canonical correspondence with the finite factor representations of the inductive limit unitary group. This construction includes the quasi-free representations of the canonical commutation and anti-commutation relations. To establish this correspondence requires a non-linear form of complete positivity as developed by Arveson.
Abstract. In his second paper [21] on asymptotic formulae of nonmodular q series, EM Wright intro... more Abstract. In his second paper [21] on asymptotic formulae of nonmodular q series, EM Wright introduced the concept of weighted partitions by investigating the weighted sum of all partitions whereas the contribution of a partition λ with k parts would be given by xk for x> 0. This paper develops analogues of these results for plane partitions by investigating the weighted count of all plane partitions whereas the contribution of λ whose trace is k is given by ℜxk for x∈ C.
ABSTRACT Non-commutative harmonic analysis on locally compact groups is generally a difficult tas... more ABSTRACT Non-commutative harmonic analysis on locally compact groups is generally a difficult task due to the nature of the group representations. Applications of the Fourier transform of groups other than Rn have been limited due to the difficulties in numerically computing the analytical form. We present an integral operator approach with induced representations to determine the generalized Fourier transform of three dimensional semi-direct product groups.
Introduction. Let G denote the universal-covering of the DeSitter group and C*(G) the group C*-al... more Introduction. Let G denote the universal-covering of the DeSitter group and C*(G) the group C*-algebra of G, ie, the enveloping C*-algebra of the involutive Banach algebra LX(G) (see [2]). The main goal of this paper is to give a complete description of the structure of C*(G). Briefly, the main result is that C*(G) is isomorphic to the restricted product of certain C*-algebras whose structures have concrete descriptions given by the extension theory of C. Delaroche [1].
In the representation theory of inductive limit groups, wide classes of representations are studi... more In the representation theory of inductive limit groups, wide classes of representations are studied via the dynamical system (X, G) attached to an AF C*-algebra, even for nonlocally compact groups [17]. Questions of factoriality and equivalence are translated into problems of ergodicity and equivalence of probability measures on X.
Abstract Let PL (n) be the number of all plane partitions of n while ppk (n) be the number of pla... more Abstract Let PL (n) be the number of all plane partitions of n while ppk (n) be the number of plane partitions of n whose trace is exactly k. We study the zeros of polynomial versions Qn (x) of plane partitions where Qn (x)=∑ ppk (n) xk. Based on the asymptotics we have developed for Qn (x) and computational evidence, we determine the limiting behavior of the zeros of Qn (x) as n→∞. The distribution of the zeros has a two-scale behavior which has order n2/3 inside the unit disk while has order n on the unit circle.
Abstract. In the study of the asymptotic behavior of polynomials from partition theory, the deter... more Abstract. In the study of the asymptotic behavior of polynomials from partition theory, the determination of their leading term asymptotics inside the unit disk depends on a sequence of sets derived from comparing certain complexvalued functions constructed from polylogarithms, functions defined as
Abstract It is well-known that the Fourier partial sums of a function exhibit the Gibbs phenomeno... more Abstract It is well-known that the Fourier partial sums of a function exhibit the Gibbs phenomenon at a jump discontinuity. We study the same question for de la Vallée-Poussin sums. Here we find a new Gibbs function and a new Gibbs constant. When the function is continuous, a behavior similar to the Gibbs phenomenon also occurs at a kink. We call it the “generalized Gibbs phenomenon”. Let, where x 0 is a kink and where kn (g, x) represents Fourier partial sums and de la Vallée-Poussin sums.
The representation theory of infinite wreath product groups is developed by means of the relation... more The representation theory of infinite wreath product groups is developed by means of the relationship between their group algebras and conjugacy classes with those of the infinite symmetric group. Further, since these groups are inductive limits of finite groups, their finite characters can be classified as limits of normalized irreducible characters of prelimit finite groups. This identification is called the “asymptotic character formula.” The K0-invariant of the group C∗-algebra is also determined.
The representation theory of approximately finite-dimensional (AF) C*-alge~ bras was vigorously d... more The representation theory of approximately finite-dimensional (AF) C*-alge~ bras was vigorously developed by Strätilä and Voiculescu. Their main objective was a study of the unitary representations о Г the unitary group (/(со), the direct limit of the classical unitary groups U (n); such a study had been previously suggested by Kirillov [7].
Abstract Let Hm (z) be a sequence of polynomials whose generating function∑ m Hm (z) tm= N (t, z)... more Abstract Let Hm (z) be a sequence of polynomials whose generating function∑ m Hm (z) tm= N (t, z)/D (t, z) is rational with the denominator D (t, z)= A (z) tn+ B (z) t+ 1, where A (z) and B (z) are polynomials in z with complex coefficients and N (t, z) and D (t, z) do not have a trivial common factor. We show that the zero attractor of Hm (z) is a portion of an real algebraic curve together with a finite subset of the set of roots of the polynomial A (z) Rest (N (t, z), D (t, z)).
We study the limiting behavior of the zeros of the Euler polynomials. When linearly scaled, they ... more We study the limiting behavior of the zeros of the Euler polynomials. When linearly scaled, they approach a definite curve in the complex plane related to the Szegö curve which governs the behavior of the roots of the Taylor polynomials associated to the exponential function. Further, under a conformal transformation, the scaled zeros are uniformly distributed.
This paper introduces the truncator map as a dynamical system on the space of configurations of a... more This paper introduces the truncator map as a dynamical system on the space of configurations of an interacting particle system. We represent the symbolic dynamics generated by this system as a non-commutative algebra and classify its periodic orbits using properties of endomorphisms of the resulting algebraic structure. A stochastic model is constructed on these endomorphisms, which leads to the classification of the distribution of periodic orbits for random truncator maps.
Abstract: Let $ p_n $ be the number of partitions of an integer $ n $. For each of the partition ... more Abstract: Let $ p_n $ be the number of partitions of an integer $ n $. For each of the partition statistics of counting their parts, ranks, or cranks, there is a natural family of integer polynomials. We investigate their asymptotics and the limiting behavior of their zeros as sets and densities.
Abstract: Increased day-trading activity and the subsequent jump in intraday volatility and tradi... more Abstract: Increased day-trading activity and the subsequent jump in intraday volatility and trading volume fluctuations has raised considerable interest in models for financial market microstructure. We investigate the random transitions between two phases of an agent-based spin market model on a random network. The objective of the agents is to balance their desire to belong to the global minority and simultaneously to the local majority.
Abstract: Let $ F_n (x) $ be the partition polynomial $\ sum_ {k= 1}^ n p_k (n) x^ k $ where $ p_... more Abstract: Let $ F_n (x) $ be the partition polynomial $\ sum_ {k= 1}^ n p_k (n) x^ k $ where $ p_k (n) $ is the number of partitions of $ n $ with $ k $ parts. We emphasize the computational experiments using degrees up to $70,000 $ to discover the asymptotics of these polynomials. Surprisingly, the asymptotics of $ F_n (x) $ have two scales of orders $ n $ and $\ sqrt {n} $ and in three different regimes inside the unit disk. Consequently, the zeros converge to network of curves inside the unit disk given in terms of the dilogarithm.
We begin by classifying all solutions of two natural recurrences that Bernstein polynomials satis... more We begin by classifying all solutions of two natural recurrences that Bernstein polynomials satisfy. The first scheme gives a natural characterization of Stancu polynomials. In Section 2, we identify the Bernstein polynomials as coefficients in the generating function for the elementary symmetric functions, which gives a new proof of total positivity for Bernstein polynomials, by identifying the required determinants as Schur functions.
Abstract: In this short note we investigate the natur of the phase transitions in a spin market m... more Abstract: In this short note we investigate the natur of the phase transitions in a spin market model as a function of the interaction strength between local and global effects. We find that the stochastic dynamics of this stylized market model exhibit a periodicity whose dependence on the coupling constant in the Ising-like Hamiltonian is robust to changes in the temperature and the size of the market.
ABSTRACT. Let pn be the number of partitions of an integer n. For each of the partition statistic... more ABSTRACT. Let pn be the number of partitions of an integer n. For each of the partition statistics of counting their parts, ranks, or cranks, there is a natural family of integer polynomials. We investigate their asymptotics and the limiting behavior of their zeros as sets and densities.
Abstract: General semifinite factor representations of the diffeomorphism group of euclidean spac... more Abstract: General semifinite factor representations of the diffeomorphism group of euclidean space are constructed by means of a canonical correspondence with the finite factor representations of the inductive limit unitary group. This construction includes the quasi-free representations of the canonical commutation and anti-commutation relations. To establish this correspondence requires a non-linear form of complete positivity as developed by Arveson.
Abstract. In his second paper [21] on asymptotic formulae of nonmodular q series, EM Wright intro... more Abstract. In his second paper [21] on asymptotic formulae of nonmodular q series, EM Wright introduced the concept of weighted partitions by investigating the weighted sum of all partitions whereas the contribution of a partition λ with k parts would be given by xk for x> 0. This paper develops analogues of these results for plane partitions by investigating the weighted count of all plane partitions whereas the contribution of λ whose trace is k is given by ℜxk for x∈ C.
ABSTRACT Non-commutative harmonic analysis on locally compact groups is generally a difficult tas... more ABSTRACT Non-commutative harmonic analysis on locally compact groups is generally a difficult task due to the nature of the group representations. Applications of the Fourier transform of groups other than Rn have been limited due to the difficulties in numerically computing the analytical form. We present an integral operator approach with induced representations to determine the generalized Fourier transform of three dimensional semi-direct product groups.
Introduction. Let G denote the universal-covering of the DeSitter group and C*(G) the group C*-al... more Introduction. Let G denote the universal-covering of the DeSitter group and C*(G) the group C*-algebra of G, ie, the enveloping C*-algebra of the involutive Banach algebra LX(G) (see [2]). The main goal of this paper is to give a complete description of the structure of C*(G). Briefly, the main result is that C*(G) is isomorphic to the restricted product of certain C*-algebras whose structures have concrete descriptions given by the extension theory of C. Delaroche [1].
In the representation theory of inductive limit groups, wide classes of representations are studi... more In the representation theory of inductive limit groups, wide classes of representations are studied via the dynamical system (X, G) attached to an AF C*-algebra, even for nonlocally compact groups [17]. Questions of factoriality and equivalence are translated into problems of ergodicity and equivalence of probability measures on X.
Abstract Let PL (n) be the number of all plane partitions of n while ppk (n) be the number of pla... more Abstract Let PL (n) be the number of all plane partitions of n while ppk (n) be the number of plane partitions of n whose trace is exactly k. We study the zeros of polynomial versions Qn (x) of plane partitions where Qn (x)=∑ ppk (n) xk. Based on the asymptotics we have developed for Qn (x) and computational evidence, we determine the limiting behavior of the zeros of Qn (x) as n→∞. The distribution of the zeros has a two-scale behavior which has order n2/3 inside the unit disk while has order n on the unit circle.
Abstract. In the study of the asymptotic behavior of polynomials from partition theory, the deter... more Abstract. In the study of the asymptotic behavior of polynomials from partition theory, the determination of their leading term asymptotics inside the unit disk depends on a sequence of sets derived from comparing certain complexvalued functions constructed from polylogarithms, functions defined as
Abstract It is well-known that the Fourier partial sums of a function exhibit the Gibbs phenomeno... more Abstract It is well-known that the Fourier partial sums of a function exhibit the Gibbs phenomenon at a jump discontinuity. We study the same question for de la Vallée-Poussin sums. Here we find a new Gibbs function and a new Gibbs constant. When the function is continuous, a behavior similar to the Gibbs phenomenon also occurs at a kink. We call it the “generalized Gibbs phenomenon”. Let, where x 0 is a kink and where kn (g, x) represents Fourier partial sums and de la Vallée-Poussin sums.
The representation theory of infinite wreath product groups is developed by means of the relation... more The representation theory of infinite wreath product groups is developed by means of the relationship between their group algebras and conjugacy classes with those of the infinite symmetric group. Further, since these groups are inductive limits of finite groups, their finite characters can be classified as limits of normalized irreducible characters of prelimit finite groups. This identification is called the “asymptotic character formula.” The K0-invariant of the group C∗-algebra is also determined.
The representation theory of approximately finite-dimensional (AF) C*-alge~ bras was vigorously d... more The representation theory of approximately finite-dimensional (AF) C*-alge~ bras was vigorously developed by Strätilä and Voiculescu. Their main objective was a study of the unitary representations о Г the unitary group (/(со), the direct limit of the classical unitary groups U (n); such a study had been previously suggested by Kirillov [7].
Abstract Let Hm (z) be a sequence of polynomials whose generating function∑ m Hm (z) tm= N (t, z)... more Abstract Let Hm (z) be a sequence of polynomials whose generating function∑ m Hm (z) tm= N (t, z)/D (t, z) is rational with the denominator D (t, z)= A (z) tn+ B (z) t+ 1, where A (z) and B (z) are polynomials in z with complex coefficients and N (t, z) and D (t, z) do not have a trivial common factor. We show that the zero attractor of Hm (z) is a portion of an real algebraic curve together with a finite subset of the set of roots of the polynomial A (z) Rest (N (t, z), D (t, z)).
Uploads
Papers by Robert Boyer