An Equivariant Generalization of McDuff's Theorem

Abstract

In 1976, Kan and Thurston proved the theorem that any path-connected space X is homology equivalent to the classifying space of some discrete group G. In 1979, McDuff proved a homotopy version of it: any path-connected space X has the same weak homotopy type as the classifying space of some discrete monoid M. In 1984, Fiedorowicz reproved McDuff's theorem using a largely categorical construction. In this paper we will generalize Fiedorowicz's proof of McDuff's theorem to the equivariant case. Precisely, we will prove that any G-connected space X with a G-fixed basepoint x0 has the same weak homotopy type as the classifying space of some discrete G-monoid.

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