The Linear Bound for the Natural Weighted Resolution of the Haar Shift

Abstract

The Hilbert transform has a linear bound in the A2 characteristic on weighted L2, equation* H L2(w)→ L2(w) [ w ] A2, equation* and we extend this linear bound to the nine constituent operators in the natural weighted resolution of the conjugation Mw12S Mw-12 induced by the canonical decomposition of a multiplier into paraproducts:% equation* Mf=Pf-+Pf0+Pf+. equation* The main tools used are composition of paraproducts, a product formula for Haar coefficients, the Carleson Embedding Theorem, and the linear bound for the square function.