Copyright © 2010 Bo-Yong Long and Yu-Ming Chu. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

For p∈ℝ, the generalized logarithmic mean Lp(a,b), arithmetic mean A(a,b), and geometric mean G(a,b) of two positive numbers a and b are defined by Lp(a,b)=a, for a=b, Lp(a,b)=[(bp+1-ap+1)/((p+1)(b-a))]1/p, for p≠0, p≠-1, and a≠b, Lp(a,b)=(1/e)(bb/aa)1/(b-a), for p=0, and a≠b, Lp(a,b)=(b-a)/(log⁡⁡b-log⁡⁡a), for p=-1, and a≠b, A(a,b)=(a+b)/2, and G(a,b)=ab, respectively. In this paper, we find the greatest value p (or least value q, resp.) such that the inequality Lp(a,b)<αA(a,b)+(1-α)G(a,b) (or αA(a,b)+(1-α)G(a,b)<Lq(a,b), resp.) holds for α∈(0,1/2)(or α∈(1/2,1), resp.) and all a,b>0 with a≠b.