The A2 theorem with the Dini condition
Abstract
Let T be an L2-bounded operator having an ω-Calder\'on--Zygmund kernel K with a modulus of continuity ω. If ω satisfied the Dini condition ∫01ω(t) t/t<∞, then T satisfies the A2 theorem TfL2(w) [w]A2fL2(w) and many related estimates, as a consequence of a domination by dyadic operators.
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