An improved bound for sumsets of thick compact sets via the Shapley--Folkman theorem

Abstract

Let E1,…,En ⊂ Rd be compact sets of positive diameter with Feng--Wu thickness at least c>0. Feng and Wu proved that E1+·s+En has non-empty interior when n>211c-3+1. We show that \[n> d(1+c-1)2= d\,(1+c+1)2c2\] already suffices. In particular, since 0<c 1, the bound n>6 d\,c-2 is enough. For fixed dimension d, this improves the exponent in c-1 from 3 to 2, while introducing only an explicit factor of d. The proof replaces the one-summand-at-a-time enlargement of Feng--Wu by a simultaneous convexification step based on a radius form of the Shapley--Folkman theorem.