On Hardy type inequalities for weighted means

Abstract

The aim of this paper is to establish weighted Hardy type inequality in a broad family of means. In other words, for a fixed vector of weights (λn)n=1∞ and a weighted mean M, we search for the smallest number C such that Σn=1∞ λn M ((x1,…,xn),(λ1,…,λn)) C Σn=1∞ λnxn for all admissible x. The main results provide a definite answer in the case when M is monotone and satisfies the weighted counterpart of the Kedlaya inequality. In particular, if M is symmetric, Jensen-concave, and the sequence (λnλ1+·s+λn) is nonincreasing. In addition, it is proved that if M is a symmetric and monotone mean, then the biggest possible weighted Hardy constant is achieved if λ is the constant vector.