Fast formulas for the Hurwitz values ζ(2,a) and ζ(3,a)

Abstract

We prove two fast formulas for the Hurwitz values ζ(2,a) and ζ(3,a) respectively with the help of the WZ method. In them (a)n denotes the rising factorial or Pochhammer's symbol defined by (a)0=1 and (a)n=a(a+1)·s(a+n-1) for positive integers n. The Huwitz ζ function is defined by ζ(s,a)=ζ(0,s,a)=Σk=0∞ (k+a)-s. In addition, we can use these fast evaluations to compute also in a rapid way Dirichlet values of the kinds L(2) and L(3).

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