On the number of three-term arithmetic progressions in a dense subset of Fqn

Abstract

Let q be an odd prime power. Combining the discussion of Varnavides and a recent theorem of Ellenberg and Gijswijt, we show that a subset A⊂ Fqn will contain many non-trivial three-term arithmetic progressions, whenever |A|≥ (cq q)n for some constant cq>0. After the first version of our manuscript was uploaded in the arXiv, we learned from Professors Jacob Fox and Terence Tao that our result is a special case of a result of Fox and Lovasz [1, Theorem 3]. In fact, [1, Theorem 3] gives a much better bound than ours. For example, when q=3, the lower bound given by Fox and Lovasz is |A|2· (|A|q-n)11.901, while our bound is |A|2· (|A|q-n)25.803. We thank Professors Jacob Fox and Terence Tao for their helpful comments on our manuscript. [1] Jacob Fox, L\'aszl\'o Mikl\'os Lov\'asz, A tight bound for Green's arithmetic triangle removal lemma in vector spaces, preprint, arXiv:1606.01230.