Equivariant Topology of Configuration Spaces

Abstract

We study the Fadell-Husseini index of the configuration space F(Rd,n) with respect to different subgroups of the symmetric group Sn. For p prime and d>0, we completely determine IndexZ/p(F(Rd,p);Fp) and partially describe Index(Z/p)k(F(Rd,pk);Fp). In this process we obtain results of independent interest, including: (1) an extended equivariant Goresky-MacPherson formula, (2) a complete description of the top homology of the partition lattice Pip as an Fp[Zp]-module, and (3) a generalized Dold theorem for elementary abelian groups. The results on the Fadell-Husseini index yield a new proof of the Nandakumar & Ramana Rao conjecture for a prime. For n=pk a prime power, we compute the Lusternik-Schnirelmann category cat(F(Rd,n)/Sn)=(d-1)(n-1). Moreover, we extend coincidence results related to the Borsuk-Ulam theorem, as obtained by Cohen & Connett, Cohen & Lusk, and Karasev & Volovikov.