On equivariant fibrations of G-CW-complexes

Abstract

It is proved that if G is a compact Lie group, then an equivariant Serre fibration of G-CW-complexes is an equivariant Hurewicz fibration in the class of compactly generated G-spaces. In the nonequivariant setting, this result is due to Steinberger, West and Cauty. The main theorem is proved using the following key result: a G-CW-complex can be embedded as an equivariant retract in a simplicial G-complex. It is also proved that an equivariant map p: E B of G-CW-complexes is a Hurewicz G-fibration if and only if the H-fixed point map pH : EH BH is a Hurewicz fibration for any closed subgroup H of G. This gives a solution to the problem of James and Segal in the case of G-CW-complexes.