On sum sets of convex functions

Abstract

In this paper we prove new bounds for sums of convex or concave functions. Specifically, we prove that for all A,B ⊂eq R finite sets, and for all f,g convex or concave functions, we have |A + B|38|f(A) + g(B)|38 |A|49|B|49. This result can be used to obtain bounds on a number of two-variable expanders of interest, as well as to the asymmetric sum-product problem. We also adjust our technique to also prove the three-variable expansion result \[ |AB+A| |A|32 +3170\,. \] Our methods follow a series of recent developments in the sum-product literature, presenting a unified picture. Of particular interest is an adaptation of a regularisation technique of Xue, that enables us to find positive proportion subsets with certain desirable properties.