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
AbstractWe introduce an α-calculus with the help of the generalized Bernoulli polynomials. The param...
summary:Using the operator $\frak {D}_{q,\varrho }^{m}(\lambda ,l)$, we introduce the subclasses $\f...
AbstractWe examine a q-analogue of Mahler expansions for continuous functions in p-adic analysis, re...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
AbstractWe establish q-analogues of Taylor series expansions in special polynomial bases for functio...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
Certain expansion formulae for a basic analogue of the Fox’s H-function have been derived by the app...
AbstractThe extended Engel expansion is an algorithm that leads to unique series expansions of q-ser...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractTwo integrals of Ramanujan are used to define a q-analogue of the Euler beta integral on the...
AbstractThis article gives a q-version of the generalized Legendre polynomials recently introduced b...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
AbstractIn this paper, q-calculus analogues of some classical and some recent integral inequalities ...
AbstractUsing a method of Siegel and theq-derivation, we compute explicitly the Padé–Hermite approxi...
The purpose of this article is to generalize the ring of \(q\)-Appell polynomials to the complex cas...
AbstractWe introduce an α-calculus with the help of the generalized Bernoulli polynomials. The param...
summary:Using the operator $\frak {D}_{q,\varrho }^{m}(\lambda ,l)$, we introduce the subclasses $\f...
AbstractWe examine a q-analogue of Mahler expansions for continuous functions in p-adic analysis, re...
AbstractIn this article, Cauchy’s integral formula for nth q-derivative of analytic functions is est...
AbstractWe establish q-analogues of Taylor series expansions in special polynomial bases for functio...
The Laurent expansion is a well-known topic in complex analysis for its application in obtaining res...
Certain expansion formulae for a basic analogue of the Fox’s H-function have been derived by the app...
AbstractThe extended Engel expansion is an algorithm that leads to unique series expansions of q-ser...
AbstractAn algorithm is considered, and shown to lead to various unusual and unique series expansion...
AbstractTwo integrals of Ramanujan are used to define a q-analogue of the Euler beta integral on the...
AbstractThis article gives a q-version of the generalized Legendre polynomials recently introduced b...
summary:In this paper we give an extension of $q$-Pfaff-Saalschütz formula by means of Andrews-Askey...
AbstractIn this paper, q-calculus analogues of some classical and some recent integral inequalities ...
AbstractUsing a method of Siegel and theq-derivation, we compute explicitly the Padé–Hermite approxi...
The purpose of this article is to generalize the ring of \(q\)-Appell polynomials to the complex cas...
AbstractWe introduce an α-calculus with the help of the generalized Bernoulli polynomials. The param...
summary:Using the operator $\frak {D}_{q,\varrho }^{m}(\lambda ,l)$, we introduce the subclasses $\f...
AbstractWe examine a q-analogue of Mahler expansions for continuous functions in p-adic analysis, re...