Weighted Hardy Inequalities for Nested Averages

Abstract

We study a family of Hardy-type inequalities for weighted averages over nested subsets of a measure space. Given a partition of a measure space and a weight function m, we consider operators of the form \[ f 1Mn∫X(n) m(x)f(x)\,dμ(x), \] with additional weights on the resulting sequence of averages. In particular, we generalize an inequality obtained by Vincent and Sohani in VincentSohani2025 and characterize the boundedness in terms of the finiteness of a single testing quantity β. We also provide two-sided estimates for the best constant Copt, namely \[ β≤ Copt ≤ p1/q (p')1/p'β≤ 2β. \] Thus the characterization is never off by more than a factor of 2. We also develop a second approach, inspired by Broadbent's proof of Hardy's inequality, which gives a local sufficient condition that often provides sharper constants and recovers several important cases, including the classical weighted Hardy inequality.