Some Bernstein functions and integral representations concerning harmonic and geometric means

Abstract

It is general knowledge that the harmonic mean H(x,y)=21x+1y and that the geometric mean G(x,y)=xy\,, where x and y are two positive numbers. In the paper, the authors show by several approaches that the harmonic mean Hx,y(t)=H(x+t,y+t) and the geometric mean Gx,y(t)=G(x+t,y+t) are all Bernstein functions of t∈(-\x,y\,∞) and establish integral representations of the means Hx,y(t) and Gx,y(t).