Obstructions for constructing equivariant fibrations

Abstract

Let G be a finite group and H be a family of subgroups of G which is closed under conjugation and taking subgroups. Let B be a G-CW-complex whose isotropy subgroups are in H and let F= \FH\H ∈ H be a compatible family of H-spaces. A G-fibration over B with fiber F= \FH\H ∈ H is a G-equivariant fibration p:E → B where p-1(b) is Gb-homotopy equivalent to FGb for each b ∈ B. In this paper, we develop an obstruction theory for constructing G-fibrations with fiber F over a given G-CW-complex B. Constructing G-fibrations with a prescribed fiber F is an important step in the construction of free G-actions on finite CW-complexes which are homotopy equivalent to a product of spheres.