Discrete analogues of maximally modulated singular integrals of Stein-Wainger type

Abstract

Consider the maximal operator C f(x) = λ∈R|Σy∈Zn\0\ f(x-y) e(λ |y|2d) K(y)|, (x∈Zn), where d is a positive integer, K a Calder\'on-Zygmund kernel and n 1. This is a discrete analogue of a real-variable operator studied by Stein and Wainger. The nonlinearity of the phase introduces a variety of new difficulties that are not present in the real-variable setting. We prove 2(Zn)-bounds for C, answering a question posed by Lillian Pierce.