New correction theorems in the light of a weighted Littlewood--Paley--Rubio de Francia inequality
Abstract
We prove the following correction theorem: every function f on the circumference T that is bounded by the α1-weight w (this means that Mw2 ≤ C w2) can be modified on a set e with ∫e w ≤ so that its quadratic function built up from arbitary sequence of nonintersecting intervals in Z will not exceed C 1 w.
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