Discrete Analogoues in Harmonic Analysis: Maximally Monomially Modulated Singular Integrals Related to Carleson's Theorem

Abstract

Motivated by Bourgain's work on pointwise ergodic theorems, and the work of Stein and Stein-Wainger on maximally modulated singular integrals without linear terms, we prove that the maximally monomially modulated discrete Hilbert transform, \[ Cdf(x) := λ | Σm ≠ 0 f(x-m) e2π i λ mdm | \] is bounded on all p, \ 2 - 1d2 + 1 < p < ∞, for any d ≥ 2. We also establish almost everywhere pointwise convergence of the modulated ergodic Hilbert transforms (as λ 0) \[ Σm ≠ 0 Tm f(x) · e2π i λ mdm \] for any measure-preserving system (X,μ,T), and any f ∈ Lp(X), \ 2 - 1d2 +1 < p < ∞.