AbstractWe obtain a “Kronecker limit formula” for the Epstein zeta function. This is done by introducing a generalized gamma function attached to the Epstein zeta function. The methods involve generalizing ideas of Shintani and Stark. We first show that a generalized gamma function appears as the value at s=0 of the first derivative of the associated Epstein zeta function. Then this is used to yield Kronecker's limit formula and its “s=0”-version
Abstract. The Epstein zeta function Z ( s) is defined for Re a> 1 by where a, b, c are real numb...
The essentials of fractional calculus according to different approaches that can be useful for our a...
The essentials of fractional calculus according to different approaches that can be useful for our a...
International audienceThe Kronecker limit formula for a positive definite binary quadratic form or t...
In this article we derive a limit representation for a class of analytic functions, which gen-eraliz...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
Abstract. In this paper, we introduce a further generalization of the gamma function involving Gauss...
AbstractWe obtain a “Kronecker limit formula” for the Epstein zeta function. This is done by introdu...
AbstractWe derive a GL(3) version of Kronecker's first limit formula, and use this formula to expres...
AbstractWe derive a GL(3) version of Kronecker's first limit formula, and use this formula to expres...
In this paper we develop Windschitl’s approximation formula for the gamma function by giving two asy...
Consider the problem of defining a continuous function f(x) which agrees with factorials at integers...
Dedicated to Professor Emrush Gashi on the occasion of his 71th birthday In this paper, we present s...
학위논문 (석사)-- 서울대학교 대학원 : 수리과학부, 2013. 2. 김영원.The gamma function, introduced by the Swiss mathematicia...
Abstract. The Gamma function Γ which was first introduced by Euler in 1730 has played a very importa...
Abstract. The Epstein zeta function Z ( s) is defined for Re a> 1 by where a, b, c are real numb...
The essentials of fractional calculus according to different approaches that can be useful for our a...
The essentials of fractional calculus according to different approaches that can be useful for our a...
International audienceThe Kronecker limit formula for a positive definite binary quadratic form or t...
In this article we derive a limit representation for a class of analytic functions, which gen-eraliz...
This report attempts to explore and extend the use of Otto Hölder’s theorem on the Gamma Function, Γ...
Abstract. In this paper, we introduce a further generalization of the gamma function involving Gauss...
AbstractWe obtain a “Kronecker limit formula” for the Epstein zeta function. This is done by introdu...
AbstractWe derive a GL(3) version of Kronecker's first limit formula, and use this formula to expres...
AbstractWe derive a GL(3) version of Kronecker's first limit formula, and use this formula to expres...
In this paper we develop Windschitl’s approximation formula for the gamma function by giving two asy...
Consider the problem of defining a continuous function f(x) which agrees with factorials at integers...
Dedicated to Professor Emrush Gashi on the occasion of his 71th birthday In this paper, we present s...
학위논문 (석사)-- 서울대학교 대학원 : 수리과학부, 2013. 2. 김영원.The gamma function, introduced by the Swiss mathematicia...
Abstract. The Gamma function Γ which was first introduced by Euler in 1730 has played a very importa...
Abstract. The Epstein zeta function Z ( s) is defined for Re a> 1 by where a, b, c are real numb...
The essentials of fractional calculus according to different approaches that can be useful for our a...
The essentials of fractional calculus according to different approaches that can be useful for our a...
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