On Z-compactifiability of manifolds
Abstract
In 1976, Chapman and Siebenmann CS76 established necessary and sufficient conditions for Z-compactifying Hilbert cube manifolds. While these conditions are known to be necessary for a manifold Mn to admit a Z-compactification, it remains an open question whether these conditions are also sufficient. Guilbault and the author [Thm. 1.2]GG20 proved that these conditions are sufficient for the product Mn × [-2,2] (n≥ 5) to be Z-compactifiable. We further explore this topic by introducing additional conditions such that a Z-compactification of Mn × [-2,2] indeed implies a Z-compactification of Mn, thus partially resolving the open question. As applications, it is shown that there exist infinitely many non-pseudo-collarable 4-manifolds which are Z-compactifiable; however, pseudo-collarable manifolds with compact boundary of dimension at least six are Z-compactifiable. Furthermore, we investigate the connection between Z-compactifiability with the topological rigidity of aspherical manifolds. We also construct a noncompact one-sided s-cobordism (W,V,V) satisfying controlled Mather-Thurston theorems, where V is Z-compactifiable, whereas V may not be.
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