Weighted bound for commutators
Abstract
Let K be the Calder\'on-Zygmund convolution kernel on Rd (d≥2). Define the commutator associated with K and a∈ L∞(Rd) by \[ Taf(x)=p.v. ∫ K(x-y)mx,ya· f(y)dy. \] Recently, Grafakos and Honz\'k [5] proved that Ta is of weak type (1,1) for d=2. In this paper, we show that Ta is also weighted weak type (1,1) with the weight |x|α\,(-2<α <0) for d=2. Moreover, we prove that Ta is bounded on weighted Lp(Rd)\,(1<p<∞) for all d2.
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