Improving bounds for singular operators via Sharp Reverse H\"older Inequality for A∞

Abstract

In this expository article we collect and discuss some recent results on different consequences of a Sharp Reverse H\"older Inequality for A∞ weights. For two given operators T and S, we study Lp(w) bounds of Coifman-Fefferman type. \|Tf\|Lp(w) cn,w,p \|Sf\|Lp(w), that can be understood as a way to control T by S. We will focus on a quantitative analysis of the constants involved and show that we can improve classical results regarding the dependence on the weight w in terms of Wilson's A∞ constant [w]A∞:=Q1w(Q)∫Q M(wQ). We will also exhibit recent improvements on the problem of finding sharp constants for weighted norm inequalities involving several singular operators. We obtain mixed A1--A∞ estimates for the commutator [b,T] and for its higher order analogue Tkb. A common ingredient in the proofs presented here is a recent improvement of the Reverse H\"older Inequality for A∞ weights involving Wilson's constant.