Borel cohomology and the relative Gorenstein condition for classifying spaces of compact Lie groups

Abstract

For a compact Lie group G we show that if the representing spectrum for Borel cohomology generates its category of modules if G is connected. For a closed subgroup H of G we consider the map C*(BG)--->C*(BH) and establish the sense in which it is relatively Gorenstein. Throughout, we pay careful attention to the importance of connectedness of the groups.