Universal nowhere dense subsets of locally compact manifolds

Abstract

In each manifold M modeled on a finite or infinite dimensional cube [0,1]n we construct a closed nowhere dense subset S⊂ M (called a spongy set) which is a universal nowhere dense set in M in the sense that for each nowhere dense subset A⊂ M there is a homeomorphism h:M M such that h(A)⊂ S. The key tool in the construction of spongy sets is a theorem on topological equivalence of certain decompositions of manifolds. A special case of this theorem says that two vanishing cellular strongly shrinkable decompositions A, B of a Hilbert cube manifold M are topologically equivalent if any two non-singleton elements A∈ A and B∈ B of these decompositions are ambiently homeomorphic.