Add to ORKGAbstract. The q-beta function Bq(t, s) is defined for s, t> 0 and 0 < q < 1. Its definition can be extended, by regularization, to negative non-integer values of t and s. In this paper we define the q-beta function Bq(t, s) for negative integer values of t and s. 1
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
In this article we find some results on the q-analogue of the beta function via using the concepts o...
AbstractThe incomplete beta function Bx(a,b) is defined for a,b>0 and 0<x<1 and its definition was e...
The aim of this paper is to construct generating functions for q-beta polynomials. By using these ge...
The incomplete beta function is defined as where Beta(p, q) is the beta function. Dutka (1981) gave ...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to sc...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
The Gamma function Γ (s)(-r) is defined by Γ (s)(-r) = N - lim ε→0 ∫ε ∞ t -r-1, ln s t e -t dt for r...
International audienceThe $(-\beta)$-integers are natural generalisations of the $\beta$-integers, a...
International audienceThe (-\beta)-integers are natural generalisations of the \beta-integers, and t...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
International audienceThe finiteness property is an important arithmetical property of beta-expansio...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
In this article we find some results on the q-analogue of the beta function via using the concepts o...
AbstractThe incomplete beta function Bx(a,b) is defined for a,b>0 and 0<x<1 and its definition was e...
The aim of this paper is to construct generating functions for q-beta polynomials. By using these ge...
The incomplete beta function is defined as where Beta(p, q) is the beta function. Dutka (1981) gave ...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to sc...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
Using the q-integral representation of Sears’ nonterminating extension of the q-Saalschütz summation...
The Gamma function Γ (s)(-r) is defined by Γ (s)(-r) = N - lim ε→0 ∫ε ∞ t -r-1, ln s t e -t dt for r...
International audienceThe $(-\beta)$-integers are natural generalisations of the $\beta$-integers, a...
International audienceThe (-\beta)-integers are natural generalisations of the \beta-integers, and t...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
International audienceThe finiteness property is an important arithmetical property of beta-expansio...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...
We prove in this paper an inequality for the beta function, and we give an application in pluripoten...