Arithmetic progressions in sumsets and Lp-almost-periodicity

Abstract

We prove results about the Lp-almost-periodicity of convolutions. One of these follows from a simple but rather general lemma about approximating a sum of functions in Lp, and gives a very short proof of a theorem of Green that if A and B are subsets of 1,...,N of sizes alpha N and beta N then A+B contains an arithmetic progression of length at least about exp(c (alpha beta log N)1/2). Another almost-periodicity result improves this bound for densities decreasing with N: we show that under the above hypotheses the sumset A+B contains an arithmetic progression of length at least about exp(c (alpha log N/(log(beta-1))3)1/2).