AbstractIn this paper, we use the Andrews–Askey integral and the q-Chu–Vandermonde formula to derive a more general integral formula. Applications of the new integral formula are also given, which include to derive the q-Pfaff–Saalschütz formula and the terminating Sears's ϕ23 transformation formula
AbstractIn this paper, we give a bilateral form of an identity of Andrews, which is a generalization...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
We formulate and prove the extension of the Rogers integral formula to the adeles of number fields. ...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
AbstractIn this paper, we use the q-Chu–Vandermonde formula to derive a recurring q-integral formula...
We use the Andrews-Askey integral, the Leibniz rule for $q$-difference operator and the $q$-Chu-Van...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
[[abstract]]The main object of the present paper is to give a unification (and generalization) of tw...
AbstractThe main object of the present paper is to give a unification (and generalization) of two in...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
Abstract. We discuss several existing proofs of the value of a quartic integral and present a new pr...
AbstractWe use the Andrews–Askey integral and the Leibniz rule for the q-difference operator to give...
Dedicated to Dick Askey on the occasion of his 66th birthday, and to the memory of D.B. Sears whose ...
AbstractIn this paper, we give a bilateral form of an identity of Andrews, which is a generalization...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
We formulate and prove the extension of the Rogers integral formula to the adeles of number fields. ...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
AbstractIn this paper, we use the q-Chu–Vandermonde formula to derive a recurring q-integral formula...
We use the Andrews-Askey integral, the Leibniz rule for $q$-difference operator and the $q$-Chu-Van...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
[[abstract]]The main object of the present paper is to give a unification (and generalization) of tw...
AbstractThe main object of the present paper is to give a unification (and generalization) of two in...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
Abstract. We discuss several existing proofs of the value of a quartic integral and present a new pr...
AbstractWe use the Andrews–Askey integral and the Leibniz rule for the q-difference operator to give...
Dedicated to Dick Askey on the occasion of his 66th birthday, and to the memory of D.B. Sears whose ...
AbstractIn this paper, we give a bilateral form of an identity of Andrews, which is a generalization...
AbstractBailey's fundamental identity of bilateral well-poised ψ66-series is utilized to present sho...
We formulate and prove the extension of the Rogers integral formula to the adeles of number fields. ...
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