On some formulas for the k-analogue of Appell functions and generating relations via k-fractional derivative

Abstract

Our present investigation is mainly based on the k-hypergeometric functions which are constructed by making use of the Pochhammer k-symbol Diaz which are one of the vital generalization of hypergeometric functions. We introduce k-analogues of F2\ and F3 Appell functions denoted by the symbols F2,k\ and F3,k\ respectively, just like Mubeen et al. did for F1 in 2015 Mubeen6. Meanwhile, we prove some main properties namely integral representations, transformation formulas and some reduction formulas which help us to have relations between not only k-Appell functions but also k-hypergeometric functions. Finally, employing the theory of Riemann Liouville k-fractional derivative Rahman and using the relations which we consider in this paper, we acquire linear and bilinear generating relations for k-analogue of hypergeometric functions and Appell functions.