An infinite dimensional umbral calculus
Abstract
The aim of this paper is to develop foundations of umbral calculus on the space of distributions on , which leads to a general theory of Sheffer polynomial sequences on . We define a sequence of monic polynomials on , a polynomial sequence of binomial type, and a Sheffer sequence. We present equivalent conditions for a sequence of monic polynomials on to be of binomial type or a Sheffer sequence, respectively. We also construct a lifting of a sequence of monic polynomials on of binomial type to a polynomial sequence of binomial type on , and a lifting of a Sheffer sequence on to a Sheffer sequence on . Examples of lifted polynomial sequences include the falling and rising factorials on , Abel, Hermite, Charlier, and Laguerre polynomials on . Some of these polynomials have already appeared in different branches of infinite dimensional (stochastic) analysis and played there a fundamental role.
Cite
@article{arxiv.1701.04326,
title = {An infinite dimensional umbral calculus},
author = {Dmitri Finkelshtein and Yuri Kondratiev and Eugene Lytvynov and Maria Joao Oliveira},
journal= {arXiv preprint arXiv:1701.04326},
year = {2019}
}