The continuity of additive and convex functions, which are upper bounded on non-flat continua in Rn

Abstract

We prove that for a continuum K⊂ Rn the sum K+n of n copies of K has non-empty interior in Rn if and only if K is not flat in the sense that the affine hull of K coincides with Rn. Moreover, if K is locally connected and each non-empty open subset of K in not flat, then for any (analytic) non-meager subset A⊂ K the sum A+n of n copies of A is not meager in Rn (and then the sum A+2n of 2n copies of the analytic set A has non-empty interior in Rn and the set (A-A)+n is a neighborhood of zero in Rn). This implies that a mid-convex function f:D R, defined on an open convex subset D⊂ Rn is continuous if it is upper bounded on some non-flat continuum in D or on a non-meager analytic subset of a locally connected nowhere flat subset of D.