AbstractPaule and Schneider (2003) [3], and Chu (Chu and Donno) (2005) [1] gave a family of wonderful harmonic number identities. Their generalized versions associated with q-harmonic numbers will be established by applying a derivative operator to Watson's q-Whipple transformation
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractIn this paper we derive a q-analog of Gustafson′s U (n) generalization of Whipple′s classica...
<p>In this article, we give a new harmonic analysis associated with the generalized q-Bessel operato...
WOS: 000383001400001In this paper, by means of q-difference operator we derive q-analogue for severa...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
AbstractCombining Newton and Lagrange interpolation, we give q-identities which generalize results o...
Abstract In this paper, we establish some relations involving q-Euler type sums, q-harmonic numbers ...
Using $q$-series identities and series rearrangement, we establish severalextensions of $q$-Watson f...
AbstractThe classical hypergeometric summation theorems are exploited to derive several striking ide...
Abstract In this paper, we establish certain new subclasses of meromorphic harmonic functions using ...
AbstractIn this paper, we verify the Cauchy operator identities by a new method. And by using the Ca...
Many diverse subclasses of analytic functions, q-starlike functions, and symmetric q-starlike functi...
Andrews gave a remarkable interpretation of the Rogers–Ramanujan identities with the polynomials ρe(...
AbstractBy means of partial fraction decomposition, we establish a q-extension of an algebraic ident...
In this paper, we study the properties of the generalized harmonic numbersHn,k,r(α, β). In particula...
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractIn this paper we derive a q-analog of Gustafson′s U (n) generalization of Whipple′s classica...
<p>In this article, we give a new harmonic analysis associated with the generalized q-Bessel operato...
WOS: 000383001400001In this paper, by means of q-difference operator we derive q-analogue for severa...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
AbstractCombining Newton and Lagrange interpolation, we give q-identities which generalize results o...
Abstract In this paper, we establish some relations involving q-Euler type sums, q-harmonic numbers ...
Using $q$-series identities and series rearrangement, we establish severalextensions of $q$-Watson f...
AbstractThe classical hypergeometric summation theorems are exploited to derive several striking ide...
Abstract In this paper, we establish certain new subclasses of meromorphic harmonic functions using ...
AbstractIn this paper, we verify the Cauchy operator identities by a new method. And by using the Ca...
Many diverse subclasses of analytic functions, q-starlike functions, and symmetric q-starlike functi...
Andrews gave a remarkable interpretation of the Rogers–Ramanujan identities with the polynomials ρe(...
AbstractBy means of partial fraction decomposition, we establish a q-extension of an algebraic ident...
In this paper, we study the properties of the generalized harmonic numbersHn,k,r(α, β). In particula...
AbstractA number of linear, bilinear, and multilinear generating functions are obtained here for var...
AbstractIn this paper we derive a q-analog of Gustafson′s U (n) generalization of Whipple′s classica...
<p>In this article, we give a new harmonic analysis associated with the generalized q-Bessel operato...
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