Enhanced inequalities about arithmetic and geometric means

Abstract

For n positive numbers (ak, 1≤ k ≤ n), enhanced inequalities about the arithmetic mean (An Σkakn) and the geometric mean (Gn [n]kak) are found if some numbers are known, namely, equation GnAn ≤ (n-Σk=1mrkn-m)1-mn(k=1mrk)1n \:, equation if we know ak=Anrk (1≤ k≤ m≤ n) for instance, and equation GnAn ≤ 1(1-mn)k=1mrk-1n-m+1nΣk=1mrk \: , equation if we know ak=Gnrk (1≤ k≤ m ≤ n) for instance. These bounds are better than those derived from S.~H.~Tung's work [1].