A harmonic mean inequality for the q-gamma and q-digamma functions

Abstract

We prove amongs others results that the harmonic mean of q(x) and q(1/x) is greater than or equal to 1 for arbitrary x > 0 and q∈ J where J is a subset of [0,+∞). Also, we prove that for there is p0∈(1,9/2), such that for q∈(0,p0), q(1) is the minimum of the harmonic mean of q(x) and q(1/x) for x > 0 and for q∈(p0,+∞), q(1) is the maximum. Our results generalize some known inequalities due to Alzer and Gautschi.