Subconvexity in inhomogeneous Vinogradov systems

Abstract

When k and s are natural numbers and h∈ Zk, denote by Js,k(X; h) the number of integral solutions of the system \[ Σi=1s(xij-yij)=hj (1 j k), \] with 1 xi,yi X. When s<k(k+1)/2 and (h1,… ,hk-1) 0, Brandes and Hughes have shown that Js,k(X; h)=o(Xs). In this paper we improve on quantitative aspects of this result, and, subject to an extension of the main conjecture in Vinogradov's mean value theorem, we obtain an asymptotic formula for Js,k(X; h) in the critical case s=k(k+1)/2. The latter requires minor arc estimates going beyond square-root cancellation.