Subconvexity and the Hilbert-Kamke Problem

Abstract

When s k 3 and n1,… ,nk are large natural numbers, denote by As,k( n) the number of solutions in non-negative integers x to the system \[ x1j+… +xsj=nj (1 j k). \] Under appropriate local solubility conditions on n, we obtain an asymptotic formula for As,k( n) when s k(k+1). This establishes a local-global principle in the Hilbert-Kamke problem at the convexity barrier. Our arguments involve minor arc estimates going beyond square-root cancellation.