New bounds for Szemeredi's theorem, Ia: Progressions of length 4 in finite field geometries revisited

Abstract

Let p > 4 be a prime. We show that the largest subset of Fpn with no 4-term arithmetic progressions has cardinality << N(log N)-c, where c = 2-22 and N := pn. A result of this type was claimed in a previous paper by the authors and published in Proc. London Math. Society. Unfortunately the proof had a gap, and we issue an erratum for that paper here. Our new argument is different and significantly shorter. In fact we prove a stronger result, which can be viewed as a quantatitive version of some previous results of Bergelson-Host-Kra and the authors.