Analytical and differential - algebraic properties of Gamma function
摘要
In this paper we consider some analytical relations between gamma function and related functions such as the Kurepa's function and alternating Kurepa's function . It is well-known in the physics that the Casimir energy is defined by the principal part of the Riemann function (Blau, Visser, Wipf; Elizalde). Analogously, we consider the principal parts for functions , , and we also define and consider the principal part for arbitrary meromorphic functions. Next, in this paper we consider some differential-algebraic d.a. properties of functions , , , . As it is well-known (H\" older; Ostrowski) is not a solution of any d.a. equation. It appears that this property of is universal. Namely, a large class of solutions of functional differential equations also has that property. Proof of these facts is reduced, by the use of the theory of differential algebraic fields (Ritt; Kaplansky; Kolchin), to the d.a. transcendency of .
引用
@article{arxiv.math/0605430,
title = {Analytical and differential - algebraic properties of Gamma function},
author = {Zarko Mijajlovic and Branko Malesevic},
journal= {arXiv preprint arXiv:math/0605430},
year = {2008}
}
备注
Paper by invitation for The Special Volume dedicated to the Tricentennial Birthday Anniversary of L. Euler, 2007