On generalization of Bailey's identity involving product of generalized hypergeometric series

Abstract

The aim of this research paper is to obtain explicit expressions of (i) 1F1 [arrayc α \\ 2α + i array ; x ]. 1F1[ arrayc β \\ 2β + j array ; x ] (ii) 1F1 [ arrayc α \\ 2α - i array ; x ] . 1F1 [ arrayc β \\ 2β - j array ; x ] (iii) 1F1 [ arrayc α \\ 2α + i array ; x ] . 1F1 [arrayc β \\ 2β - j array ; x ] in the most general form for any i,j=0,1,2,… For i=j=0, we recover well known and useful identity due to Bailey. The results are derived with the help of a well known Bailey's formula involving products of generalized hypergeometric series and generalization of Kummer's second transformation formulas available in the literature. A few interesting new as well as known special cases have also been given.