Some Additions to a Family of Sums and Integrals related to Hurwitz' Zeta Function(s), Euler polynomials and Euler Numbers

Abstract

Integrals involving the kernel function sech (π x) over a semi-infinite range are of general interest in the study of Riemann's function ζ(s) and Hurwitz' function ζ(s,a). Such integrals that include the arctan and log functions in the integrand are evaluated here in terms of ζ(s,a), thereby adding some new members to a known family of related integrals. A claimed connection between ζ(s) of odd integer argument and such integrals is verified.