English

The ABC of Hyper Recursions

Classical Analysis and ODEs 2016-09-07 v1 Numerical Analysis

Abstract

Each family of Gauss hypergeometric functions fn=2F1(a+ϵ1n,b+ϵ2n;c+ϵ3n;z), f_n={}_2F_1(a+\epsilon_1n, b+\epsilon_2n ;c+\epsilon_3n; z), for fixed ϵj=0,±1\epsilon_j=0,\pm1 (not all ϵj\epsilon_j equal to zero) satisfies a second order linear difference equation of the form Anfn1+Bnfn+Cnfn+1=0. A_nf_{n-1}+B_nf_n+C_nf_{n+1}=0. Because of symmetry relations and functional relations for the Gauss functions, many of the 26 cases (for different ϵj\epsilon_j 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 fnf_n (minimal or dominant) as n±n\to \pm\infty. A second independent solution is given in each basic case which is dominant when fnf_n 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.

Keywords

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