We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight rearrangement by a well-known formula. The first formula has been given in different form by Annaby and Mansour. We give concise proofs for q-analogues of Eulerian integral formulas for general q-hypergeometric functions corresponding to Erdelyi, and for two of Srivastavas triple hypergeometric functions and other functions. All proofs are made in a similar style by using q-integration. We find some new formulas for fractional q-integrals including a series expansion. In the same way, the operator formulas by Srivastava and Manocha find a natural generalization
Abstract This paper deals with Al-Salam fractional q-integral operator and its application to certai...
Abstract. In this paper, we investigate the basic analogue of a new hypergeometric function, which i...
. We present relatively simple and direct proofs of the integral representations established recentl...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
The purpose of this article is to introduce a new complete multiple q-hypergeometric symbolic calcul...
Dedicated to Dick Askey on the occasion of his 66th birthday, and to the memory of D.B. Sears whose ...
A q-integral is a definite integral of a function of q having an expansion in non-negative powers of...
Abstract. In the present paper certain operational formulae involving Riemann-Liouville and Kober fr...
In this paper, we consider a certain system of triple q-integral equations, where the kernel is the ...
AbstractIn this paper, we first give two interesting operator identities, and then, using them and t...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
We study q-integral representations of the q-gamma and the q-beta functions. This study leads to a v...
In this paper, we develop the theory of the multiple q-analogue of the Heine's binomial formula, cha...
This nine-chapter monograph introduces a rigorous investigation of q-difference operators in standar...
Abstract This paper deals with Al-Salam fractional q-integral operator and its application to certai...
Abstract. In this paper, we investigate the basic analogue of a new hypergeometric function, which i...
. We present relatively simple and direct proofs of the integral representations established recentl...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
The purpose of this article is to introduce a new complete multiple q-hypergeometric symbolic calcul...
Dedicated to Dick Askey on the occasion of his 66th birthday, and to the memory of D.B. Sears whose ...
A q-integral is a definite integral of a function of q having an expansion in non-negative powers of...
Abstract. In the present paper certain operational formulae involving Riemann-Liouville and Kober fr...
In this paper, we consider a certain system of triple q-integral equations, where the kernel is the ...
AbstractIn this paper, we first give two interesting operator identities, and then, using them and t...
This is a continuation of [19], where we presented an extension of the q-hypergeometric function wit...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
We study q-integral representations of the q-gamma and the q-beta functions. This study leads to a v...
In this paper, we develop the theory of the multiple q-analogue of the Heine's binomial formula, cha...
This nine-chapter monograph introduces a rigorous investigation of q-difference operators in standar...
Abstract This paper deals with Al-Salam fractional q-integral operator and its application to certai...
Abstract. In this paper, we investigate the basic analogue of a new hypergeometric function, which i...
. We present relatively simple and direct proofs of the integral representations established recentl...