Topological model categories generated by finite complexes
Abstract
Our main result states that for each finite complex L the category TOP of topological spaces possesses a model category structure (in the sense of Quillen) whose weak equivalences are precisely maps which induce isomorphisms of all [L]-homotopy groups. The concept of [L]-homotopy has earlier been introduced by the first author and is based on Dranishnikov's notion of extension dimension. As a corollary we obtain an algebraic characterization of [L]-homotopy equivalences between [L]-complexes. This result extends two classical theorems of J. H. C. Whitehead. One of them -- describing homotopy equivalences between CW-complexes as maps inducing isomorphisms of all homotopy groups -- is obtained by letting L = \ point\. The other -- describing n-homomotopy equivalences between at most (n+1)-dimensional CW-complexes as maps inducing isomorophisms of k-dimensional homotopy groups with k ≤ n -- by letting L = Sn+1, n ≥ 0.
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