Additive equations in dense variables via truncated restriction estimates

Abstract

We study translation-invariant additive equations of the form Σi=1s λi P(ni) = 0 in variables ni ∈ Zd, where the λi are nonzero integers summing to zero, and P is a system of homogeneous polynomials such that the above equation is invariant by translation. We investigate the solvability of this equation in subsets of density ( N)-c(P,λ) of a large box [N]d, via the energy increment method. We obtain positive results in roughly the number of variables currently needed to derive a count of the solutions in the complete box [N]d, for the curve P = (x,…,xk) and the multidimensional systems of large degree studied by Parsell, Prendiville and Wooley, using only a weak form of restriction estimates. We also obtain results for the (d+1)-dimensional parabola P=(x1,…,xd,x12+…b+xd2) that rely on the recent Strichartz estimates of Bourgain and Demeter.