The Linear Bound for Haar Multiplier Paraproducts
Abstract
We study the natural resolution of the conjugated Haar multiplier Mw12TσMw-12, where the multiplication operators Mw12 are decomposed into their canonical paraproduct decompositions. We prove that each constituent operator obtained from this resolution has a linear bound on L2(Rd;w) in terms of the A2 characteristic of w. The main tools used are a product formula for Haar coefficients, the Carleson Embedding Theorem, the linear bound for the square function, and the well-known linear bound of Tσ on L2(Rd,w).
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