Coronated polyhedra and coronated ANRs
Abstract
Locally compact separable metrizable spaces are characterized among all metrizable spaces as those that admit a cofinal sequence K1⊂ K2⊂·s of compact subsets. Their Cech cohomology is well-understood due to Petkova's short exact sequence 01 Hn-1(Ki) Hn(X) Hn(Ki) 0. We study a dual class of spaces. We call a metrizable space X a "coronated polyhedron" if it contains a compactum K such that X K is a polyhedron. These include, apart from compacta and polyhedra, spaces such as the topologist's sine curve (or the Warsaw circle) and the comb (=comb-and-flea) space. The complement of every locally compact subset of Sn is a coronated polyhedron. We prove that a metrizable space X is a coronated polyhedron if and only if it admits a countable polyhedral resolution; or, equivalently, a sequential polyhedral resolution … R2 R1. In the latter case, we establish a short exact sequence 01 Hn+1(Ri) Hn(X) Hn(Ri) 0 for Steenrod-Sitnikov homology and also for any (extraordinary) homology theory satisfying Milnor's axioms of map excision and Π-additivity. We also show that such homology theories are invariants of strong shape for coronated polyhedra. On the other hand, Quigley's short exact sequence 01πn+1(Ri)πn(X)πn(Ri) 0 for Steenrod homotopy of compacta fails for Steenrod-Sitnikov homotopy of coronated polyhedra, at least when n=0.
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