A construction of N\"obeling manifolds of arbitrary weight

Abstract

For each cardinal , each natural number n and each simplicial complex K we construct a space n(K) and a map π n(K) K such that the following conditions are satisfied. 1. n(K) is a complete metric n-dimensional space of weight . 2. n(K) is an absolute neighborhood extensor in dimension n. 3. n(K) is strongly universal in the class of n-dimensional complete metric spaces of weight~. 4. π is an n-homotopy equivalence. For = ω the constructed spaces are n-dimensional separable N\"obeling manifolds. The constructed spaces have very interesting fractal-like internal structure that allows for easy construction, subdivision, and surgery of brick partitions.