Diophantine equations in primes: density of prime points on affine hypersurfaces

Abstract

Let F ∈ Z[x1, …, xn] be a homogeneous form of degree d ≥ 2, and let VF* denote the singular locus of the affine variety V(F) = \ z ∈ Cn: F(z) = 0 \. In this paper, we prove the existence of integer solutions with prime coordinates to the equation F(x1, …, xn) = 0 provided F satisfies suitable local conditions and n - VF* ≥ 28 34 52 d3 (2d-1)2 4d. Our result improves on what was known previously due to Cook and Magyar (B. Cook and A. Magyar, `Diophantine equations in the primes'. Invent. Math. 198 (2014), 701-737), which required n - VF* to be an exponential tower in d.