Higher convexity and iterated sum sets

Abstract

Let f be a smooth real function with strictly monotone first k derivatives. We show that for a finite set A, with |A+A|≤ K|A|, |2kf(A)-(2k-1)f(A)|k |A|k+1-o(1)/KOk(1). We deduce several new sum-product type implications, e.g. that A+A being small implies unbounded growth for a many enough times iterated product set A ·s A.