AbstractIt is common to represent a sequence a=(a0, a1, …) of complex numbers with a generating function. G.C. Rota once remarked that among all the possible generating functions that might be used to represent a, the ordinary and exponential generating functions are the most ubiquitous. It is unclear what, if anything, makes these two particular representations special. We show here that the ordinary and exponential representations uniquely possess the property that the determinants of the Hankel matrices of certain convolutional polynomials in a are independent of a1. Hankel matrices are closely associated with the problem of moments and the problem of moment preserving maps and hence the independence of a1 has some curious implications. ...
International audienceThe concern of this paper is a famous combinatorial formula known under the na...
AbstractWe first generalize the Schur congruence for Legendre polynomials to sequences of polynomial...
Several problems with applications in signal processing, functional approximation involve series r...
AbstractIt is common to represent a sequence a=(a0, a1, …) of complex numbers with a generating func...
AbstractWe develop a general context for the computation of the determinant of a Hankel matrix Hn = ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1994.Includes bibliogr...
Computation of generating functions for renewal sequences is performed by means of the multivariate ...
The aim of this paper is to construct generating functions for new families of combinatorial numbers...
In this paper, we are interested in the moments of the characteristic polynomial Zn(x) of the n×n pe...
AbstractA q-analog of functional composition for Eulerian generating functions is introduced and app...
AbstractSeveral general classes of generating functions are established for a certain sequence of fu...
AbstractWe provide a unifying polynomial expression giving moments in terms of cumulants, and vice v...
AbstractA 1996 result of Bender and Canfield showed that passing a log-concave sequence through the ...
Which combinatorial sequences correspond to moments of probability measures on the real line? We pre...
We study a family of polynomials that are orthogonal with respect to the weight function exp(iwx) in...
International audienceThe concern of this paper is a famous combinatorial formula known under the na...
AbstractWe first generalize the Schur congruence for Legendre polynomials to sequences of polynomial...
Several problems with applications in signal processing, functional approximation involve series r...
AbstractIt is common to represent a sequence a=(a0, a1, …) of complex numbers with a generating func...
AbstractWe develop a general context for the computation of the determinant of a Hankel matrix Hn = ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1994.Includes bibliogr...
Computation of generating functions for renewal sequences is performed by means of the multivariate ...
The aim of this paper is to construct generating functions for new families of combinatorial numbers...
In this paper, we are interested in the moments of the characteristic polynomial Zn(x) of the n×n pe...
AbstractA q-analog of functional composition for Eulerian generating functions is introduced and app...
AbstractSeveral general classes of generating functions are established for a certain sequence of fu...
AbstractWe provide a unifying polynomial expression giving moments in terms of cumulants, and vice v...
AbstractA 1996 result of Bender and Canfield showed that passing a log-concave sequence through the ...
Which combinatorial sequences correspond to moments of probability measures on the real line? We pre...
We study a family of polynomials that are orthogonal with respect to the weight function exp(iwx) in...
International audienceThe concern of this paper is a famous combinatorial formula known under the na...
AbstractWe first generalize the Schur congruence for Legendre polynomials to sequences of polynomial...
Several problems with applications in signal processing, functional approximation involve series r...