A sharp estimate for the Hilbert transform along finite order lacunary sets of directions

Abstract

Let D be a nonnegative integer and ⊂ S1 be a lacunary set of directions of order D. We show that the Lp norms, 1<p<∞, of the maximal directional Hilbert transform in the plane H f(x):= v∈ |p.v.∫ R f(x+tv)d tt|, x ∈ R2, are comparable to (\#)12. For vector fields vD with range in a lacunary set of of order D and generated using suitable combinations of truncations of Lipschitz functions, we prove that the truncated Hilbert transform along the vector field vD, HvD,1 f(x):= p.v. ∫ |t| ≤ 1 f(x+tvD(x)) \,d tt, is Lp-bounded for all 1<p<∞. These results extend previous bounds of the first author with Demeter, and of Guo and Thiele.