On the maximal directional Hilbert transform

Abstract

For any dimension n ≥ 2, we consider the maximal directional Hilbert transform HU on Rn associated with a direction set U ⊂eq Sn-1: \[ HUf(x) := 1π v ∈ U | p.v. ∫ f(x - tv) \, dtt|.\] The main result in this article asserts that for any exponent p ∈ (1, ∞), there exists a positive constant Cp,n such that for any finite direction set U ⊂eq Sn-1, \[||HU||p → p ≥ Cp,n \#U, \] where \#U denotes the cardinality of U. As a consequence, the maximal directional Hilbert transform associated with an infinite set of directions cannot be bounded on Lp(Rn) for any n≥ 2 and any p ∈ (1, ∞). This completes a result of Karagulyan, who proved a similar statement for n=2 and p=2.