Translating measurable sets

Abstract

We prove that if A,B are compact subsets of R such that the upper density of B is positive at every point of B, then there is a closed null set N⊂ A such that N+B=A+B. As a corollary we find that if A,B⊂ R are measurable, and every null subset N of A can be translated into B (that is, if B contains a suitable translate of N), then there is a null set N0 such that A N0 can be translated into B. The topic is related to some consistency results of the theory of additive properties of the reals.