A note on transverse sets and bilinear varieties

Abstract

Let G and H be finite-dimensional vector spaces over Fp. A subset A ⊂eq G × H is said to be transverse if all of its rows \x ∈ G (x,y) ∈ A\, y ∈ H, are subspaces of G and all of its columns \y ∈ H (x,y) ∈ A\, x ∈ G, are subspaces of H. As a corollary of a bilinear version of Bogolyubov argument, Gowers and the author proved that dense transverse sets contain bilinear varieties of bounded codimension. In this paper, we provide a direct combinatorial proof of this fact. In particular, we improve the bounds and evade the use of Fourier analysis and Freiman's theorem and its variants.