Points on polynomial curves in small boxes modulo an integer

Abstract

Given an integer q and a polynomial f∈ Zq[X] of degree d with coefficients in the residue ring Zq= Z/q Z, we obtain new results concerning the number of solutions to congruences of the form y f(x) q, with integer variables lying in some cube B of side length H. Our argument uses ideas of Cilleruelo, Garaev, Ostafe and Shparlinski which reduces the problem to the Vinogradov mean value theorem and a lattice point counting problem. We treat the lattice point problem differently using transference principles from the Geometry of Numbers. We also use a variant of the main conjecture for the Vinogradov mean value theorem of Bourgain, Demeter and Guth and of Wooley which allows one to deal with rather sparse sets.