Maximal Theorems for the Directional Hilbert Transform on the Plane
Abstract
For a Schwartz function f on the plane and a non-zero v∈2 define the Hilbert transform of f in the direction v to be Hvf(x)=p.v.∫ f(x-vy) dyy Let ζ be a Schwartz function with frequency support in the annulus 1| |2. We prove that the maximal operator v=1Hvζ* f maps L2 into weak L2, and Lp into Lp for p>2. The L2 estimate is sharp. The method of proof is based upon techniques related to the pointwise convergence of Fourier series, especially the recent proof given by Lacey and Thiele.
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