On Kedlaya type inequalities for weighted means

Abstract

In 2016 we proved that for every symmetric, repetition invariant and Jensen concave mean M the Kedlaya-type inequality A(x1,M(x1,x2),…,M(x1,…,xn)) M (x1, A(x1,x2),…,A(x1,…,xn)) holds for an arbitrary (xn) (A stands for the arithmetic mean). We are going to prove the weighted counterpart of this inequality. More precisely, if (xn) is a vector with corresponding (non-normalized) weights (λn) and Mi=1n(xi,λi) denotes the weighted mean then, under analogous conditions on M, the inequality Ai=1n (Mj=1i (xj,λj),\:λi) Mi=1n (Aj=1i (xj,λj),\:λi) holds for every (xn) and (λn) such that the sequence (λkλ1+·s+λk) is decreasing.