Multivariate Delta Goncarov and Abel Polynomials
Abstract
Classical Gon\v{c}arov polynomials are polynomials which interpolate derivatives. Delta Gon\v{c}arov polynomials are polynomials which interpolate delta operators, e.g., forward and backward difference operators. We extend fundamental aspects of the theory of classical bivariate Gon\v{c}arov polynomials and univariate delta Gon\v{c}arov polynomials to the multivariate setting using umbral calculus. After introducing systems of delta operators, we define multivariate delta Gon\v{c}arov polynomials, show that the associated interpolation problem is always solvable, and derive a generating function (an Appell relation) for them. We show that systems of delta Gon\v{c}arov polynomials on an interpolation grid are of binomial type if and only if for some matrix . This motivates our definition of delta Abel polynomials to be exactly those delta Gon\v{c}arov polynomials which are based on such a grid. Finally, compact formulas for delta Abel polynomials in all dimensions are given for separable systems of delta operators. This recovers a former result for classical bivariate Abel polynomials and extends previous partial results for classical trivariate Abel polynomials to all dimensions.
Cite
@article{arxiv.1608.05836,
title = {Multivariate Delta Goncarov and Abel Polynomials},
author = {Rudolph Lorentz and Salvatore Tringali and Catherine H. Yan},
journal= {arXiv preprint arXiv:1608.05836},
year = {2016}
}
Comments
20 pages, no figures