A note on sets avoiding rational distances

Abstract

In this paper we shall give a short proof of the result originally obtained by Ashutosh Kumar that for each A⊂ R there exists B⊂ A full in A such that no distance between two distinct points from B is rational. We will construct a Bernstein subset of R which also avoids rational distances. We will show some cases in which the former result may be extended to subsets of R2, i. e. it remains true for measurable subsets of the plane and if non(N)=cof(N) then for a given set of positive outer measure we may find its full subset which is a partial bijection and avoids rational distances.