A mean value inequalities for the polygamma and zeta functions
Abstract
A recently published result states inequalities of the harmonic mean of the digamma function. In this work, we prove among others results that for all positive real numbers x≠ 1, -γ<-γ H(x,1/x)<γ2(H(x,1/x))<(1/H(x,1/x))<H((x), (1/x)), H(ζ(x),ζ(1/x))<-2, and for all x∈(0,1) ζ(1/2)<H(ζ(x),ζ(1-x))<-1, 41+ 4<H(η(x),η(1-x))<(1- 2)ζ(1/2). Here, ='/ denotes the digamma function, γ is Euler's constant, ζ is the Riemann's zeta function and η is the Dirichlet's eta function.
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