Some extensions of Diananda's inequality
Abstract
Let Mn,r=(Σi=1nqixir) 1r, r ≠ 0 and Mn,0=r → 0Mn,r be the weighted power means of n non-negative numbers xi with qi > 0 satisfying Σni=1qi=1. For a real number α and mutually distinct real numbers r, s, t, we define align* r,s,t,α= | Mαn,r-Mαn,tMαn,r-Mαn,s |. align* A result of Diananda gives sharp bounds of 1, 1/2, 0, 1 in terms of functions of q only, where q= qi. In this paper, we prove similar sharp bounds of r,s,t,α for certain parameters r, s, t, α.
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