AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is established and used to introduce a new proof to q-Taylor series by means of using the residue calculus in the complex analysis. Some theorems related to this formula are presented. A q-extension of a Laurent expansion is derived and proved by means of using Cauchy’s integral formula for a function, which is analytic on a ring-shaped region bounded by two concentric circles. Three illustrative examples are presented to be as applications for a q-Laurent expansion
AbstractIn this paper, q-calculus analogues of some classical and some recent integral inequalities ...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
Certain expansion formulae for a basic analogue of the Fox’s H-function have been derived by the app...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
Background. The new generalization of the function of complex variable (q-function) is considered, ...
A q-integral is a definite integral of a function of q having an expansion in non-negative powers of...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
Strip integrals are constructed, by means of an averaging process, and applied to representing solu...
AbstractTwo integrals of Ramanujan are used to define a q-analogue of the Euler beta integral on the...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
The present work has the scope to show the Laurent Series for quaternionic functions. It will be sho...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
Abstract. A classical result on expansion of an analytic function in a series of Jacobi polynomials ...
AbstractWe establish two new q-analogues of a Taylor series expansion for polynomials using special ...
AbstractIn this paper, q-calculus analogues of some classical and some recent integral inequalities ...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
Certain expansion formulae for a basic analogue of the Fox’s H-function have been derived by the app...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
We present three q-Taylor formulas with q-integral remainder. The two last proofs require a slight r...
Background. The new generalization of the function of complex variable (q-function) is considered, ...
A q-integral is a definite integral of a function of q having an expansion in non-negative powers of...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
Strip integrals are constructed, by means of an averaging process, and applied to representing solu...
AbstractTwo integrals of Ramanujan are used to define a q-analogue of the Euler beta integral on the...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
The present work has the scope to show the Laurent Series for quaternionic functions. It will be sho...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
Abstract. A classical result on expansion of an analytic function in a series of Jacobi polynomials ...
AbstractWe establish two new q-analogues of a Taylor series expansion for polynomials using special ...
AbstractIn this paper, q-calculus analogues of some classical and some recent integral inequalities ...
AbstractIn this paper, we give an extension of the q-beta integral. Applications of the extension ar...
Certain expansion formulae for a basic analogue of the Fox’s H-function have been derived by the app...