Inversion formula with hypergeometric polynomials and its application to an integral equation
Classical Analysis and ODEs
2019-04-18 v1 Discrete Mathematics
Performance
Abstract
For any complex parameters and , we provide a new class of linear inversion formulas between sequences and , where the infinite lower-triangular matrix and its inverse involve Hypergeometric polynomials , namely for . Functional relations between the ordinary (resp. exponential) generating functions of the related sequences and are also given. These new inversion formulas have been initially motivated by the resolution of an integral equation recently appeared in the field of Queuing Theory; we apply them to the full resolution of this integral equation. Finally, matrices involving generalized Laguerre polynomials polynomials are discussed as specific cases of our general inversion scheme.
Cite
@article{arxiv.1904.08283,
title = {Inversion formula with hypergeometric polynomials and its application to an integral equation},
author = {Ridha Nasri and Alain Simonian and Fabrice Guillemin},
journal= {arXiv preprint arXiv:1904.08283},
year = {2019}
}
Comments
22 pages, no figure