Theresa C. Anderson, Armen Vagharshakyan
Published 2012-06-12Version 1
Here we show that Lerner's method of local mean oscillation gives a simple proof of the $A_2$ conjecture for spaces of homogeneous type: that is, the linear dependence on the $A_2$ norm for weighted $L^2$ Calderon-Zygmund operator estimates. In the Euclidean case, the result is due to Hyt\"{o}nen, and for geometrically doubling spaces, Nazarov, Rezinikov, and Volberg obtained the linear bound.
Homogeneous spaces adapted to singular integral operators involving rotations
$H^1$ and dyadic $H^1$
Sharp weighted estimates involving one supremum
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