The ABC of Hyper Recursions
Abstract
Each family of Gauss hypergeometric functions for fixed (not all equal to zero) satisfies a second order linear difference equation of the form Because of symmetry relations and functional relations for the Gauss functions, many of the 26 cases (for different values) can be transformed into each other. We give a set of basic equations from which all other equations can be obtained. For each basic equation, we study the existence of minimal solutions and the character of (minimal or dominant) as . A second independent solution is given in each basic case which is dominant when is minimal and vice-versa. In this way, satisfactory pairs of linearly independent solutions for each of the 26 second order linear difference equations can be obtained.
Cite
@article{arxiv.math/0410057,
title = {The ABC of Hyper Recursions},
author = {Amparo Gil and Javier Segura and Nico M. Temme},
journal= {arXiv preprint arXiv:math/0410057},
year = {2016}
}
Comments
21 pages, 3 figures. Keywords: Gauss hypergeometric functions, recursion relations, difference equations, stability of recursion relations, numerical evaluation of special functions, asymptotic analysis