Universal nowhere dense and meager sets in Menger manifolds

Abstract

In each Menger manifold M we construct: (i) a closed nowhere dense subset M0 which is homeomorphic to M and is universal nowhere dense in the sense that for each nowhere dense set A⊂ M there is a homeomorphism h of M such that h(A)⊂ M0; (ii) a meager Fσ-set 0⊂ M which is universal meager in the sense that for each meager subset B⊂ M there is a homeomorphism h of M such that h(B)⊂ 0. Also we prove that any two universal meager Fσ-sets in M are ambiently homeomorphic.