Two improvements in Brauer's theorem on forms

Abstract

Let k be a Brauer field, that is, a field over which every diagonal form in sufficiently many variables has a nonzero solution; for instance, k could be an imaginary quadratic number field. Brauer proved that if f1, …, fr are homogeneous polynomials on a k-vector space V of degrees d1, …, dr, then the variety Z defined by the fi's has a non-trivial k-point, provided that V is sufficiently large compared to the di's and k. We offer two improvements to this theorem, assuming k is infinite. First, we show that the Zariski closure of the set Z(k) of k-points has codimension <C, where C is a constant depending only on the di's and k. And second, we show that if the strength of the fi's is sufficiently large in terms of the di's and k, then Z(k) is actually Zariski dense in Z. The proofs rely on recent work of Ananyan and Hochster on high strength polynomials.