Simultaneous equations and inequalities

Abstract

Let λi, μj be non-zero real numbers not all of the same sign and let ai, bk be non-zero integers not all of the same sign. We investigate a mixed Diophantine system of the shape equation* cases | λ1 x1θ + ·s + λ xθ + μ1 y1θ + ·s + μm ymθ | < τ \\[10pt] a1 x1d + ·s a xd + b1 z1d + ·s + bn znd =0, cases equation* where d≥ 2 is an integer, θ > d+1 is real and non-integral and τ is a positive real number. For such systems we obtain an asymptotic formula for the number of positive integer solutions (x, y, z) = (x1, …, zn) inside a bounded box. Our approach makes use of a two-dimensional version of the classical Hardy-Littlewood circle method and the Davenport--Heilbronn--Freeman method. The proof involves a combination of essentially optimal mean value estimates for the auxiliary exponential sums, together with estimates stemming from the classical Weyl and Weyl-van der Corput inequalities.