Spaces which invert weak homotopy equivalences
Abstract
It is well known that if X is a CW-complex, then for every weak homotopy equivalence f:A B, the map f*:[X,A] [X,B] induced in homotopy classes is a bijection. For which spaces X is f*:[B,X] [A,X] a bijection for every weak equivalence f? This question was considered by J. Strom and T. Goodwillie. In this note we prove that a non-empty space inverts weak equivalences if and only if it is contractible.
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