Low-codimensional Subvarieties Inside Dense Multilinear Varieties

Abstract

Let G1, . . . , Gk be nite-dimensional vector spaces over a prime eld Fp. Let V be a va- riety inside G1 ×· · ·×Gk de ned by a multilinear map. We show that if |V |≥ c|G1|· · · |Gk|, then V contains a subvariety de ned by at most K(logp c−1 + 1) multilinear forms, where K depends on k only. This result is optimal up to multiplicative constant and is relevant to the partition vs. analytic rank problem in additive combinatorics