Characterization of the Hardy property of means and the best Hardy constants

Abstract

The aim of this paper is to characterize in broad classes of means the so-called Hardy means, i.e., those means Mn=1∞ R+n+ that satisfy the inequality Σn=1∞ M(x1,…,xn) CΣn=1∞ xn for all positive sequences (xn) with some finite positive constant C. One of the main results offers a characterization of Hardy means in the class of symmetric, increasing, Jensen concave and repetition invariant means and also a formula for the best constant C satisfying the above inequality.