Preserving Z-sets by Dranishnikov's resolution

Abstract

We prove that Dranishnikov's k-dimensional resolution dk μk Q is a UVn-1-divider of Chigogidze's k-dimensional resolution ck. This fact implies that dk-1 preserves Z-sets. A further development of the concept of UVn-1-dividers permits us to find sufficient conditions for dk-1(A) to be homeomorphic to the N\"obeling space k or the universal pseudoboundary σk. We also obtain some other applications.