The cohomology of BPU(pm) and invariant polynomials

Abstract

Let p be an odd prime. For a compact Lie group G and an elementary abelian p-group A of G, one may define the Weyl group WA of A in a similar fashion as defining the Weyl group of a maximal torus, such that WA acts on H*(BA;R) for any coefficient ring R, and the image of the restriction H*(BG;R) H*(BA;R) lies in H*(BA;R)WA, the sub-algebra of H*(BA:R) of WA-invariant elements. In this paper, we consider the projective unitary group PU(pm) and one of its maximal elementary abelian p-subgroup Am, of which the Weyl group is isomorphic to Sp2m(Fp). Then the theory of Sp2m(Fp)-invariant polynomials over Fp may be applied to study the cohomology of BPU(pm), the classifying space of PU(pm). Following a theorem by Quillen, we deduce several theorems on H*(BPU(pm);Fp) modulo the nilradical from results on invariant polynomials.