A two weight inequality for Calder\'on-Zygmund operators on spaces of homogeneous type with applications

Abstract

Let (X,d,μ ) be a space of homogeneous type in the sense of Coifman and Weiss, i.e. d is a quasi metric on X and μ is a positive measure satisfying the doubling condition. Suppose that u and v are two locally finite positive Borel measures on (X,d,μ ). Subject to the pair of weights satisfying a side condition, we characterize the boundedness of a Calder\'on--Zygmund operator T from L2(u) to L2(v) in terms of the A2 condition and two testing conditions. For every cube B⊂ X, we have the following testing conditions, with 1B taken as the indicator of B equation* T(u1B) L2(B, v)≤ T 1B L2(u), equation* equation* T (v1B) L2(B, u)≤ T 1B L2(v). equation* The proof uses stopping cubes and corona decompositions originating in work of Nazarov, Treil and Volberg, along with the pivotal side condition.