Areas of triangles and Beck's theorem in planes over finite fields

Abstract

It is shown that any subset E of a plane over a finite field q, of cardinality |E|>q determines not less than q-12 distinct areas of triangles, moreover once can find such triangles sharing a common base. It is also shown that if |E|≥ 64q2 q, then there are more than q2 distinct areas of triangles sharing a common vertex. The result follows from a finite field version of the Beck theorem for large subsets of q2 that we prove. If |E|≥ 64q2 q, there exists a point z∈ E, such that there are at least q4 straight lines incident to z, each supporting the number of points of E other than z in the interval between |E|2q and 2|E|q. This is proved by combining combinatorial and Fourier analytic techniques. We also discuss higher-dimensional implications of these results in light of recent developments.