Using Jackson's q-derivative and the q-Stirling numbers, we establish some transformation theorems leading to the values of some convergent q-series
We establish two new q-analogues of a Taylor series expansion for polynomials using special Askey-Wi...
Using $q$-series identities and series rearrangement, we establish severalextensions of $q$-Watson f...
By utilizing the modified Abel lemma on summation by parts, we examine a class of quintic q-series, ...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
AbstractIn this paper, we first give an interesting operator identity. Furthermore, using the q-expo...
AbstractWe prove q-Taylor series for Jackson q-difference operators. Absolute and uniform convergenc...
The q-derivative operator approach is illustrated by reviewing several typical summation formulae of...
summary:The $q$-derivative operator approach is illustrated by reviewing several typical summation f...
AbstractIn this paper, we first give two interesting operator identities, and then, using them and t...
AbstractA large number of summation and transformation formulas for a certain class of double hyperg...
We revisit the q-deformed counterpart of the Zassenhaus formula, expressing the Jackson q-exponentia...
Cubic sums of the Gaussian q-binomial coefficients with certain weight functions will be evaluated i...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
In this paper, the author define the generalized q-derivative oprator and obtain its relation with s...
AbstractMultiple basic hypergeometric series associated to the unitary group U(n+1) have been invest...
We establish two new q-analogues of a Taylor series expansion for polynomials using special Askey-Wi...
Using $q$-series identities and series rearrangement, we establish severalextensions of $q$-Watson f...
By utilizing the modified Abel lemma on summation by parts, we examine a class of quintic q-series, ...
AbstractIn this paper, we show how to use the q-exponential operator techniques to derive a transfor...
AbstractIn this paper, we first give an interesting operator identity. Furthermore, using the q-expo...
AbstractWe prove q-Taylor series for Jackson q-difference operators. Absolute and uniform convergenc...
The q-derivative operator approach is illustrated by reviewing several typical summation formulae of...
summary:The $q$-derivative operator approach is illustrated by reviewing several typical summation f...
AbstractIn this paper, we first give two interesting operator identities, and then, using them and t...
AbstractA large number of summation and transformation formulas for a certain class of double hyperg...
We revisit the q-deformed counterpart of the Zassenhaus formula, expressing the Jackson q-exponentia...
Cubic sums of the Gaussian q-binomial coefficients with certain weight functions will be evaluated i...
ABSTRACT. There are presently three distinct q-analogues of the Lagrange inversion problem. By relat...
In this paper, the author define the generalized q-derivative oprator and obtain its relation with s...
AbstractMultiple basic hypergeometric series associated to the unitary group U(n+1) have been invest...
We establish two new q-analogues of a Taylor series expansion for polynomials using special Askey-Wi...
Using $q$-series identities and series rearrangement, we establish severalextensions of $q$-Watson f...
By utilizing the modified Abel lemma on summation by parts, we examine a class of quintic q-series, ...
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