Generating functions of Legendre polynomials: a tribute to Fred Brafman

Wan, James; Zudilin, W.

Title: Generating functions of Legendre polynomials: a tribute to Fred Brafman
Creator: Wan, James; Zudilin, W.
Relation: ARC.DP110104419 http://purl.org/au-research/grants/arc/DP110104419
Relation: Journal of Approximation Theory Vol. 164, Issue 4, p. 488-503
Publisher Link: http://dx.doi.org/10.1016/j.jat.2011.12.001
Publisher: Academic Press
Resource Type: journal article
Date: 2012
Description: In 1951, Brafman derived several “unusual” generating functions of classical orthogonal polynomials, in particular, of Legendre polynomials P_n(x). His result was a consequence of Bailey’s identity for a special case of Appell’s hypergeometric function of the fourth type. In this paper, we present a generalisation of Bailey’s identity and its implication to generating functions of Legendre polynomials of the form Σ^∞/_n=0 u_nP_n(x)zⁿ, where u_n is an Apéry-like sequence, that is, a sequence satisfying (n + 1)²u_n+1 = (an² + an + b)u_n − cn²u_n−1, where n ≥ 0 and u₋₁ = 0, u₀ = 1. Using both Brafman’s generating functions and our results, we also give generating functions for rarefied Legendre polynomials and construct a new family of identities for 1/π.
Subject: Legendre polynomial; Brafman’s generating function; hypergeometric series; Clausen's identity; Apéry like sequence
Identifier: http://hdl.handle.net/1959.13/934773
Identifier: uon:11902
Identifier: ISSN:0021-9045
Language: eng
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