Real zeros of Hurwitz-Lerch zeta functions in the interval (-1,0)
Abstract
For 0 < a 1, s,z ∈ C and 0 < |z| 1, the Hurwitz-Lerch zeta function is defined by (s,a,z) := Σn=0∞ zn(n+a)-s when σ := (s) >1. In this paper, we show that (σ,a,z) 0 when σ ∈ (-1,0) if and only if [I] z=1 and (3-3) /6 a 1/2 or (3+3) /6 a 1, [II] z ∈ [-1,1) and (1-z)(1-a) 1, [III] z ∈ R and 0<a 1. In addition, we give a new proof of the functional equation of (s,a,z).
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