Weighted inequalities involving two Hardy operators

Abstract

We find necessary and sufficient conditions on weights u1, u2, v1, v2, i.e. measurable, positive, and finite, a.e. on (a,b), for which there exists a positive constant C such that for given 0 < p1,q1,p2,q2 <∞ the inequality equation* split (∫ab (∫at f(s)p2 v2(s)p2 ds)q2p2 u2(t)q2 dt )1q2& \\ & -3cm C (∫ab (∫at f(s)p1 v1(s)p1 ds)q1p1 u1(t)q1 dt )1q1 split equation* holds for every non-negative, measurable function f on (a,b), where 0 a <b ∞. The proof is based on a recently developed discretization method that enables us to overcome the restrictions of the earlier results.