From the Ingham--Jessen property to mixed-mean inequalities

Abstract

For every symmetric mean M n=1∞ In I (where I an interval) and a nonzero function W \1,…,n\ N \0\, define an n-variable mean by MW(x):=M(x1,…,x1W(1)-times,…,xn,…,xnW(n)-times) for x=(x1,…,xn) ∈ In. Given two symmetric means M,\,N n=1∞ In I satisfying the so-called Ingham--Jessen inequality and some nonzero functions F1,…,Fk, G1,…,Gl \1,…,n\ N \0\, we establish sufficient conditions for inequalities of the form N ( MF1(x),…,MFk(x)) M ( NG1(x),…,NGl(x)) (x ∈ In). Our results provide a unified approach to the celebrated inequalities obtained by Kedlaya in 1994 and by Leng--Si--Zhu in 2004 and offer also new families of mixed-mean inequalities.