Compact maps and quasi-finite complexes
Abstract
The simplest condition characterizing quasi-finite CW complexes K is the implication Xτh K β(X)τ K for all paracompact spaces X. Here are the main results of the paper: Theorem: If \Ks\s∈ S is a family of pointed quasi-finite complexes, then their wedge s∈ SKs is quasi-finite. Theorem: If K1 and K2 are quasi-finite countable complexes, then their join K1 K2 is quasi-finite. Theorem: For every quasi-finite CW complex K there is a family \Ks\s∈ S of countable CW complexes such that s∈ S Ks is quasi-finite and is equivalent, over the class of paracompact spaces, to K. Theorem: Two quasi-finite CW complexes K and L are equivalent over the class of paracompact spaces if and only if they are equivalent over the class of compact metric spaces. Quasi-finite CW complexes lead naturally to the concept of Xτ F, where F is a family of maps between CW complexes. We generalize some well-known results of extension theory using that concept.
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