New bounds for Szemeredi's Theorem, I: Progressions of length 4 in finite field geometries

Abstract

Let F be a fixed finite field of characteristic at least 5. Let G = Fn be the n-dimensional vector space over F, and write N := |G|. We show that if A is a subset of G with size at least cF N(log N)-c, for some absolute constant c > 0 and some cF > 0, then A contains four distinct elements in arithmetic progression. This is equivalent, in the usual notation of additive combinatorics, to the assertion that r4(G) <<F N(log N)-c.

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