Add to ORKGThe 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, s = 0, 1, 2, . . . , where N is the neutrix having domain N′ = {ε : 0 < ε < ∞} with negligible functions finite linear sums of the functions ε λ ln s-1 ε, ln s ε : λ < 0, s = 1, 2,. .. and all functions which converge to zero in the normal sense as CMMI9.-1.epsilon1 tends to zero. In the classical sense Gamma functions is not defined for the negative integer. In this study, it is proved that for r = 1, 2,..., where φ(r) = Σ r i=1 1/i. Further results are also proved
We denote by Γ(a) and Γ(a;z) the gamma and the incomplete gamma functions, respec-tively. In this pa...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
An algorithm for computing the incomplete gamma function ?*(a, z) for real values of the parameter a...
The Gamma function $\Gamma^{(s)} (-r)$ is defined by \beqa \Gamma^{(s)}(-r)= \Nlim_{\epsilon\to 0}\i...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to s...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to sc...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
AbstractThe q-analogue of the gamma function Γq(x) is defined for x>0,0<q<1. In this work the neutri...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
학위논문 (석사)-- 서울대학교 대학원 : 수리과학부, 2013. 2. 김영원.The gamma function, introduced by the Swiss mathematicia...
AbstractThe q-analogue of the gamma function Γq(x) is defined for x>0,0<q<1. In this work the neutri...
Abstract. The Gamma function)(xΓ and the associated Gamma functions) ( ±Γ x are defined as distribut...
AbstractWe represent the Generalized Incomplete Gamma Function Γ(α,x;b)=∫x∞tα−1exp(−t−bt)dt,α∈R,x≥0,...
Multiple gamma functions and derivatives of L-functions at non-positive integers b
We denote by Γ(a) and Γ(a;z) the gamma and the incomplete gamma functions, respec-tively. In this pa...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
An algorithm for computing the incomplete gamma function ?*(a, z) for real values of the parameter a...
The Gamma function $\Gamma^{(s)} (-r)$ is defined by \beqa \Gamma^{(s)}(-r)= \Nlim_{\epsilon\to 0}\i...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to s...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to sc...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
AbstractThe q-analogue of the gamma function Γq(x) is defined for x>0,0<q<1. In this work the neutri...
The polygamma functions ψ(r)(x) are defined for all x>0 and r∈N. In this paper, the concepts of neut...
학위논문 (석사)-- 서울대학교 대학원 : 수리과학부, 2013. 2. 김영원.The gamma function, introduced by the Swiss mathematicia...
AbstractThe q-analogue of the gamma function Γq(x) is defined for x>0,0<q<1. In this work the neutri...
Abstract. The Gamma function)(xΓ and the associated Gamma functions) ( ±Γ x are defined as distribut...
AbstractWe represent the Generalized Incomplete Gamma Function Γ(α,x;b)=∫x∞tα−1exp(−t−bt)dt,α∈R,x≥0,...
Multiple gamma functions and derivatives of L-functions at non-positive integers b
We denote by Γ(a) and Γ(a;z) the gamma and the incomplete gamma functions, respec-tively. In this pa...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
An algorithm for computing the incomplete gamma function ?*(a, z) for real values of the parameter a...