Discrete restriction estimates of epsilon-removal type for kth-powers and k-paraboloids

Abstract

We obtain restriction estimates of ε-removal type for the set of k-th powers of integers, and for discrete d-dimensional surfaces of the form \[ \ (n1,…,nd,n1k + …b + ndk) \,:\, |n1|,…,|nd| ≤ N \, \] which we term 'k-paraboloids'. For these surfaces, we obtain a satisfying range of exponents for large values of d,k. We also obtain estimates of ε-removal type in the full supercritical range for k-th powers and for k-paraboloids of dimension d < k(k-2). We rely on a variety of techniques in discrete harmonic analysis originating in Bourgain's works on the restriction theory of the squares and the discrete parabola.