A New Linear Inversion Formula for a class of Hypergeometric polynomials
Abstract
Given complex parameters , , , and , consider the infinite lower triangular matrix with elements for , depending on the Hypergeometric polynomials , . After stating a general criterion for the inversion of infinite matrices in terms of associated generating functions, we prove that the inverse matrix is given by \begin{align} B_{n,k}(x,\nu;\alpha, \beta,\gamma) = & \; \displaystyle (-1)^k\binom{n+\alpha}{k+\alpha} \; \cdot \nonumber \\ & \; \biggl [ \; \frac{\gamma+k}{\beta+k} \, F(k-n,(\beta+k)\nu;\gamma+k;x) \; + \nonumber \\ & \; \; \; \frac{\beta-\gamma}{\beta+k} \, F(k-n,(\beta+k)\nu;1+\gamma+k;x) \; \biggr ] \nonumber \end{align} for , thus providing a new class of linear inversion formulas. Functional relations for the generating functions of related sequences and , that is, , are also provided.
Cite
@article{arxiv.2007.01865,
title = {A New Linear Inversion Formula for a class of Hypergeometric polynomials},
author = {Ridha Nasri and Alain Simonian and Fabrice Guillemin},
journal= {arXiv preprint arXiv:2007.01865},
year = {2020}
}
Comments
16 pages. arXiv admin note: substantial text overlap with arXiv:1904.08283, arXiv:1909.09694