Generalized Arakawa-Kaneko zeta functions
Abstract
Let p,x be real numbers, and s be a complex number, with (s)>1-r, p≥ 1, and x+1>0. The zeta function Zαp(s;x) is defined by Zαp(s;x) =1(s)∫∞0 e-xt et-1\,Liα(1-e-tp) ts-1\,dt, where α=(α1,…,αr) is a r-tuple positive integers, and Liα(z) is the one-variable multiple polylogarithms. Since Zα1(s;0)=(α;s), we call this function as a generalized Arakawa-Kaneko zeta function. In this paper, we investigate the properties and values of Zαp(s;x) with different values s, x, and p. We then give some applications on them.
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