The RO(G)-Graded Cohomology of the Equivariant Classifying Space BGSU(2)

Abstract

We compute the additive structure of the RO(Cn)-graded Bredon equivariant cohomology of the equivariant classifying space BCnSU(2), for any n that is either prime or a product of distinct odd primes, and we also compute its multiplicative structure for n=2. In particular, as an algebra over the cohomology of a point, we show that the cohomology of BC2SU(2) is generated by two elements subject to a single relation: writing σ for the sign representation of C2 in RO(C2), the generators are an element c in dimension 4σ and an element C in dimension 4+4σ, satisfying the relation c2 = ε4 c + 2 C, where ε and are elements of the cohomology of a point. Throughout, we take coefficients in the Burnside ring Mackey functor A. The key tools used are equivariant "even-dimensional freeness" and "multiplicative comparison" theorems for G-cell complexes, both proven by Lewis in [Lew88] and subsequently refined by Shulman in [Shu10], and with the former theorem extended by Basu and Ghosh in [BG16]. The latter theorem enables us to compute the multiplicative structure of the cohomology of BC2SU(2) by embedding it in a direct sum of cohomology rings whose structure is more easily understood. Both theorems require the cells of the G-cell complex to be attached in a well-behaved order, and a significant step in our work is to give BCnSU(2) a satisfactory Cn-cell complex structure.