The purpose of this article is to introduce a new complete multiple q-hypergeometric symbolic calculus, which leads to q-Euler integrals and a very similar canonical system of q-difference equations for multiple q-hypergeometric functions. q-analogues of recurrence formulas in Horns paper and Borngassers thesis lead to a more exact way to find these Frobenius solutions. To find the right formulas, the parameters in q-shifted factorials can be changed to negative integers, which give no extra q-factors. In proving these q-formulas, in the limit q & RARR;1 we obtain versions of the paper by Debiard and Gaveau for the solution of differential or q-difference equations. The paper is also a correction of some of the statements in the paper b...
We introduce a new family of special functions, namely q-Charlier multiple orthogonal polynomials. T...
In this paper we present a short description of q-analogues of Gosper's, Zeilberger's, Pet...
We find some new simple hypergeometric formulas in the footsteps of the important article by Gessel ...
The purpose of this article is to introduce a new complete multiple q-hypergeometric symbolic calcul...
We present a variety of q-formulas linked together by the q-umbral calculus introduced here, equival...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
We provide a simpler proof for an infinite product expression of Gustafson’s q-beta integral of type...
AbstractA Rodrigues type representation for the second kind solution of a second-order q-difference ...
In this paper, we develop the theory of the multiple q-analogue of the Heine's binomial formula, cha...
AbstractThis paper describes three algorithms for q -hypergeometric summation: • a multibasic analog...
In this article, a new q-generalization of the Apostol-Euler polynomials is introduced using the usu...
We solve the connection problem of a certain system of linear $q$-difference equations recently intr...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
ABSTRACT: In the present paper our result is the q-extension of the known result due to Galu´e and K...
We introduce a new family of special functions, namely q-Charlier multiple orthogonal polynomials. T...
In this paper we present a short description of q-analogues of Gosper's, Zeilberger's, Pet...
We find some new simple hypergeometric formulas in the footsteps of the important article by Gessel ...
The purpose of this article is to introduce a new complete multiple q-hypergeometric symbolic calcul...
We present a variety of q-formulas linked together by the q-umbral calculus introduced here, equival...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
We provide a simpler proof for an infinite product expression of Gustafson’s q-beta integral of type...
AbstractA Rodrigues type representation for the second kind solution of a second-order q-difference ...
In this paper, we develop the theory of the multiple q-analogue of the Heine's binomial formula, cha...
AbstractThis paper describes three algorithms for q -hypergeometric summation: • a multibasic analog...
In this article, a new q-generalization of the Apostol-Euler polynomials is introduced using the usu...
We solve the connection problem of a certain system of linear $q$-difference equations recently intr...
AbstractWe introduce natural q-analogs of hypergeometric series well-poised in SU(n), the related hy...
ABSTRACT: In the present paper our result is the q-extension of the known result due to Galu´e and K...
We introduce a new family of special functions, namely q-Charlier multiple orthogonal polynomials. T...
In this paper we present a short description of q-analogues of Gosper's, Zeilberger's, Pet...
We find some new simple hypergeometric formulas in the footsteps of the important article by Gessel ...