ABSTRACT: In the present paper our result is the q-extension of the known result due to Galu´e and Kalla [4]. Which are define for Generalized hypergeometric function S+1FS(·) in termsof an iterated q-integrals involving Gauss’s hypergeometric function 2F1(·). By using the relations between q-contiguous hypergeometric function 2F1(·), some new & known recurrence relations for the generalized hypergeometric functions of one variable are deduced in the line of Purohit [6] as a special case. I
AbstractThe hypergeometric function F12[a1,a2;a3;z] plays an important role in mathematical analysis...
We establish a new identity for generalized hypergeometric functions and apply it for first- and sec...
AbstractThe main object of this paper is to present generalizations of gamma, beta and hypergeometri...
AbstractA generalization to several variables of the Gauss hypergeometric series has been given in [...
AbstractSeveral results for contiguous function relations for hypergeometric functions of several va...
We show how, using the constructive approach for special functions introduced by Nikiforov and Uvar...
AbstractIn this paper authors prove a general theorem on generating relations for a certain sequence...
Abstract. We show how, using the constructive approach for special functions introduced by Nikiforov...
An attempt is made to derive recurrence relations of ascending, descending type and certain generati...
The Gauss contiguous relations are used to give three recurrence relations for the hypergeometric fu...
We examine the expansions of the solutions of the general Heun equation in terms of the Gauss hyperg...
The generalized hypergeometric functions in one and several variables and their natural generalizati...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
AbstractThe object of the present paper is to derive a number of transformations involving certain f...
AbstractContiguous relations for hypergeometric series contain an enormous amount of hidden informat...
AbstractThe hypergeometric function F12[a1,a2;a3;z] plays an important role in mathematical analysis...
We establish a new identity for generalized hypergeometric functions and apply it for first- and sec...
AbstractThe main object of this paper is to present generalizations of gamma, beta and hypergeometri...
AbstractA generalization to several variables of the Gauss hypergeometric series has been given in [...
AbstractSeveral results for contiguous function relations for hypergeometric functions of several va...
We show how, using the constructive approach for special functions introduced by Nikiforov and Uvar...
AbstractIn this paper authors prove a general theorem on generating relations for a certain sequence...
Abstract. We show how, using the constructive approach for special functions introduced by Nikiforov...
An attempt is made to derive recurrence relations of ascending, descending type and certain generati...
The Gauss contiguous relations are used to give three recurrence relations for the hypergeometric fu...
We examine the expansions of the solutions of the general Heun equation in terms of the Gauss hyperg...
The generalized hypergeometric functions in one and several variables and their natural generalizati...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
AbstractThe object of the present paper is to derive a number of transformations involving certain f...
AbstractContiguous relations for hypergeometric series contain an enormous amount of hidden informat...
AbstractThe hypergeometric function F12[a1,a2;a3;z] plays an important role in mathematical analysis...
We establish a new identity for generalized hypergeometric functions and apply it for first- and sec...
AbstractThe main object of this paper is to present generalizations of gamma, beta and hypergeometri...