On arithmetic sums of fractal sets in Rd

Abstract

A compact set E⊂ Rd is said to be arithmetically thick if there exists a positive integer n so that the n-fold arithmetic sum of E has non-empty interior. We prove the arithmetic thickness of E, if E is uniformly non-flat, in the sense that there exists ε0>0 such that for x∈ E and 0<r≤ diam(E), E B(x,r) never stays ε0r-close to a hyperplane in Rd. Moreover, we prove the arithmetic thickness for several classes of fractal sets, including self-similar sets, self-conformal sets in Rd (with d≥ 2) and self-affine sets in R2 that do not lie in a hyperplane, and certain self-affine sets in Rd (with d≥ 3) under specific assumptions.