Add to ORKGWe investigate some combinatorial and analytic properties of the n-dimensional Hermite polynomials introduced by Hermite in the late 19-th century. We derive combinatorial interpretations and recurrence relations for these polynomials. We also establish a new linear generating function and a Kibble–Slepian formula for the n-dimensional Hermite polynomials which generalize the Kibble–Slepian formula for the univariate Hermite polynomials and the Poisson kernel (Mehler formula) for the n-dimensional Hermite polynomials
We consider two types of Hermite polynomials of a complex variable. For each type we obtain combinat...
AbstractA combinatorial proof of the Mehler formula on Hermite polynomials is given that is based up...
AbstractL. Carlitz extended certain known generating functions for Laguerre and Jacobi polynomials t...
The first author has recently proved a Kibble-Slepian type formula for the 2D-Hermite polynomials {H...
In this paper, by making use of the generating function methods and Padé approximation techniques, w...
The first author has recently proved a Kibble-Slepian type formula for the 2D-Hermite polynomials {H...
AbstractA combinatorial proof of the Mehler formula on Hermite polynomials is given that is based up...
We study the complex Hermite polynomials {(formula presented)} in some detail, establish operational...
The Hermite polynomials are defined by: Hn y ( ) ≡ −1 ()n ey 2 dn dyn e−y2 ( ) , for n ≥ 0. (1) The...
We prove a generalization of the Kibble-Slepian formula (for Hermite polynomials) and its unitary an...
Conventional Hermite polynomials emerge in a great diversity of applications in mathematical physics...
In this study we give addition theorem, multiplication theorem and summation formula for He...
We introduce new families of Hermite polynomials and of Bessel functions from a point of view involv...
The q-Hermite polynomials are defined as a q-analogue of the matching polynomial of a complete graph...
In the present some generating functions relations of Hermite polynomial also of two, three and in t...
We consider two types of Hermite polynomials of a complex variable. For each type we obtain combinat...
AbstractA combinatorial proof of the Mehler formula on Hermite polynomials is given that is based up...
AbstractL. Carlitz extended certain known generating functions for Laguerre and Jacobi polynomials t...
The first author has recently proved a Kibble-Slepian type formula for the 2D-Hermite polynomials {H...
In this paper, by making use of the generating function methods and Padé approximation techniques, w...
The first author has recently proved a Kibble-Slepian type formula for the 2D-Hermite polynomials {H...
AbstractA combinatorial proof of the Mehler formula on Hermite polynomials is given that is based up...
We study the complex Hermite polynomials {(formula presented)} in some detail, establish operational...
The Hermite polynomials are defined by: Hn y ( ) ≡ −1 ()n ey 2 dn dyn e−y2 ( ) , for n ≥ 0. (1) The...
We prove a generalization of the Kibble-Slepian formula (for Hermite polynomials) and its unitary an...
Conventional Hermite polynomials emerge in a great diversity of applications in mathematical physics...
In this study we give addition theorem, multiplication theorem and summation formula for He...
We introduce new families of Hermite polynomials and of Bessel functions from a point of view involv...
The q-Hermite polynomials are defined as a q-analogue of the matching polynomial of a complete graph...
In the present some generating functions relations of Hermite polynomial also of two, three and in t...
We consider two types of Hermite polynomials of a complex variable. For each type we obtain combinat...
AbstractA combinatorial proof of the Mehler formula on Hermite polynomials is given that is based up...
AbstractL. Carlitz extended certain known generating functions for Laguerre and Jacobi polynomials t...