Sharp bounds for t-Haar multipliers on L2
Abstract
We show that if a weight w∈ Cd2t and there is q >1 such that w2t∈ Aqd, then the L2-norm of the t-Haar multiplier of complexity (m,n) associated to w depends on the square root of the Cd2t-characteristic of w times the square root Adq-characteristic of w2t % raised to the power (p-1)/2 times a constant that depends polynomially on the complexity. In particular, if w∈ Cd2t A∞d then w2t∈ Aqd for some q>1.
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