On a two-dimensional analog of Szemeredi's Theorem in Abelian groups

Abstract

Let G be a finite Abelian group and A be a subset G× G of cardinality at least |G|2/(log log |G|)c, where c>0 is an absolute constant. We prove that A contains a triple (k,m), (k+d,m), (k,m+d), where d does not equal 0. This theorem is a two-dimensional generalization of Szemeredi's theorem on arithmetic progressions.