Perfect dyadic operators: weighted T(1) theorem and two weight estimates

Abstract

Perfect dyadic operators were first introduced in AHMTT, where a local T(b) theorem was proved for such operators. In AY it was shown that for every singular integral operator T with locally bounded kernel on Rn × Rn there exists a perfect dyadic operator T such that T -T is bounded on Lp (dx) for all 1<p<∞. In this paper we show a decomposition of perfect dyadic operators on real line into four well known operators: two selfadjoint operators, paraproduct and its adjoint. Based on this decomposition we prove a sharp weighted version of the T(1) theorem for such operators, which implies A2 conjecture for such operators with constant which only depends on \|T(1)\|BMOd, \|T*(1)\|BMOd and the constant in testing conditions for T. Moreover, the constant depends on these parameters at most linearly. In this paper we also obtain sufficient conditions for the two weight boundedness for a perfect dyadic operator and simplify these conditions under additional assumptions that weights are in the Muckenhoupt class A∞d.