p-improving inequalities for Discrete Spherical Averages

Abstract

Let λ 2 ∈ N , and in dimensions d≥ 5, let Aλ f (x) denote the average of f \;:\; Z d R over the lattice points on the sphere of radius λ centered at x. We prove p improving properties of Aλ . equation* Aλ p p' ≤ Cd,p, ω (λ 2 ) λ d ( 1-2p), d-1d+1 < p ≤ d d-2. equation* It holds in dimension d =4 for odd λ 2 . The dependence is in terms of ω (λ 2 ), the number of distinct prime factors of λ 2 . These inequalities are discrete versions of a classical inequality of Littman and Strichartz on the L p improving property of spherical averages on R d, in particular they are scale free, in a natural sense. The proof uses the decomposition of the corresponding multiplier whose properties were established by Magyar-Stein-Wainger, and Magyar. We then use a proof strategy of Bourgain, which dominates each part of the decomposition by an endpoint estimate.