Weighted inequalities involving Hardy and Copson operators

Abstract

We characterize a four-weight inequality involving the Hardy operator and the Copson operator. More precisely, given p1, p2, q1, q2 ∈ (0, ∞), we find necessary and sufficient conditions on nonnegative measurable functions u1, u2, v1, v2 on (0,∞) for which there exists a positive constant c such that the inequality align* &(∫0∞ (∫0t f(s)p2 v2(s)p2 ds )q2p2 u2(t)q2 dt )1q2 \\ & 3cm ≤ c (∫0∞ (∫t∞ f(s)p1 v1(s)p1 ds )q1p1 u1(t)q1 dt )1q1 align* holds for every non-negative measurable function f on (0, ∞). The proof is based on discretizing and antidiscretizing techniques. The principal innovation consists in development of a new method which carefully avoids duality techniques and therefore enables us to obtain the characterization in previously unavailable situations, solving thereby a long-standing open problem. We then apply the characterization of the inequality to the establishing of criteria for embeddings between weighted Copson spaces Copp1,q1 (u1, v1) and weighted Ces\`aro spaces Cesp2, q2 (u2, v2), and also between spaces Sq(w) equipped with the norm \|f\|Sq(w)= (∫0∞ [f**(t)-f*(t)]q w(t)\,dt)1/q and classical Lorentz spaces of type .