Expansion Formulas of Basic Hypergeometric Series via the (1-xy,y-x)--Inversion and Its Applications

Abstract

With the use of the (f,g)-matrix inversion under specializations that f=1-xy,g=y-x, we establish an (1-xy,y-x)-expansion formula. When specialized to basic hypergeometric series, this (1-xy,y-x)-expansion formula leads us to some expansion formulas expressing any rφs series in variable x~t in terms of a linear combination of r+2φs+1 series in t, as well as various specifications. All these results can be regarded as common generalizations of many konwn expansion formulas in the setting of q-series. As specific applications, some new transformation formulas of q-series including new approach to the Askey-Wilson polynomials, the Rogers-Fine identity, Andrews' four-parametric reciprocity theorem and Ramanujan's 11 summation formula, as well as a transformation for certain well-poised Bailey pairs, are presented.