Weighted Inequalities for t-Haar multipliers

Abstract

In this paper, we provide necessary and sufficient conditions on a triple of weights (u,v,w) so that the t-Haar multipliers Ttw,σ, t∈ , %defined in P when σ=1, are uniformly (on the choice of signs σ) bounded from L2(u) into L2(v). These dyadic operators have symbols s(x,I)=σI\,(w(x)/ wI)t which are functions of the space variable x∈ and the frequency variable I∈ D, making them dyadic analogues of pseudo-differential operators. Here D denotes the dyadic intervals, σI=1, and wI denotes the integral average of w on I. When w 1 we have the martingale transform and our conditions recover the known two-weight necessary and sufficient conditions of Nazarov, Treil and Volberg. %We will discuss some relations between the three weights inequality for these operators given the inequality for other dyadic operators. We also show how these conditions are simplified when u=v. In particular, the martingale one-weight and the t-Haar multiplier unsigned and unweighted (corresponding to σI 1 and u=v 1) known results are recovered or improved. We also obtain necessary and sufficient testing conditions of Sawyer type for the two-weight boundedness of a single variable Haar multiplier similar to those known for the martingale transform.