Characterization and topological rigidity of Nöbeling manifolds

The author develops a theory of Noebeling manifolds similar to the theory of Hilbert space manifolds. He shows that it reflects the theory of Menger manifolds developed by M. Bestvina and is its counterpart in the realm of complete spaces. In particular the author proves the Noebeling manifold characterisation conjecture.

Table of Contents Introduction and preliminaries: Introduction Preliminaries Reducing the proof of the main results to the construction of $n$-regular and $n$-semiregular $\mathcal{N}_n$-covers: Approximation within an $\mathcal{N}_n$-cover Constructing closed $\mathcal{N}_{n}$-covers Carrier and nerve theorems Anticanonical maps and semiregularity Extending homeomorphisms by the use of a ``brick partitionings'' technique Proof of the main results Constructing $n$-semiregular and $n$-regular $\mathcal{N}_n$-covers: Basic constructions in $\mathcal{N}_{n}$-spaces Core of a cover Proof of Theorem 6.7 Bibliography Index