Ganea decompositions of classifying spaces

Abstract

We study homotopy decompositions of the classifying spaces BG of compact connected Lie groups obtained by (relative) fiber-cofiber construction. Given a pair of Borel fibrations F E BG and F' E' BG , this construction yields a tower (telescope) of spaces Xm(F,F') over BG indexed by Z+ that converges in the sense that hocolim \,(Xm)\, is weakly homotopy equivalent to BG. We determine cohomological conditions on the fibrations that produce the spaces Xm(F,F') with properties similar to those of the spaces of quasi-invariants of Weyl groups constructed by the first and third authors. We prove that, under these conditions, the resulting homotopy decompositions of BG are sharp (over Q), the spaces Xm(F,F') are rationally formal and Cohen-Macaulay, their cohomology rings being finite rank free modules over H*(BG, Q). We construct many examples which include the fundamental (maximal torus) fibration G/T BT BG as well as the universal fibration \, E comG 1 B comG 1 BG \, for the classifying space B comG of commuting elements in G introduced by Adem and G\'omez, as the first fibration in the pair. In most cases, we give an explicit presentation for the (equivariant) cohomology rings in terms of characteristic classes and compute the (equivariant) K-theory of the spaces involved. The paper contains an Appendix, where we re-examine the topological fiber-cofiber construction in an abstract setting, proving an ∞-categorical extension of the classical Ganea Theorem.