A better than 3/2 exponent for iterated sums and products over R

Abstract

In this paper, we prove that the bound \[ \ |8A-7A|,|5f(A)-4f(A)| \ |A|32 + 154-o(1) \] holds for all A ⊂ R, and for all convex functions f which satisfy an additional technical condition. This technical condition is satisfied by the logarithmic function, and this fact can be used to deduce a sum-product estimate \[ \ |16A| , |A(16)| \ |A|32 + c, \] for some c>0. Previously, no sum-product estimate over R with exponent strictly greater than 3/2 was known for any number of variables. Moreover, the technical condition on f seems to be satisfied for most interesting cases, and we give some further applications. In particular, we show that \[ |AA| ≤ K|A| \,∀ d ∈ R \0 \, \,\, |\(a,b) ∈ A × A : a-b=d \| KC |A|23-c', \] where c,C>0 are absolute constants.