When is A + x A =R

Abstract

We show that there is an additive Fσ subgroup A of R and x ∈ R such that dimH (A) = 12 and A + x A =R. However, if A ⊂eq R is a subring of R and there is x ∈ R such that A + x A =R, then A =R. Moreover, assuming the continuum hypothesis (CH), there is a subgroup A of R with dimH (A) = 0 such that x ∈ Q if and only if A + x A =R for all x ∈ R. A key ingredient in the proof of this theorem consists of some techniques in recursion theory and algorithmic randomness. We believe it may lead to applications to other constructions of exotic sets of reals. Several other theorems on measurable, and especially Borel and analytic subgroups and subfields of the reals are presented. We also discuss some of these results in the p-adics.