RO(G)-graded Bredon cohomology of Euclidean configuration spaces

Abstract

Let G be a finite group and V be a G-representation. We investigate the RO(G)-graded Bredon cohomology with constant integral coefficients of the space of ordered configurations in V. In the case that V contains a trivial subrepresentation, we show the cohomology is free as a module over the cohomology of a point, and we give a generators-and-relations description of the ring structure. In the case that V does not contain a trivial representation, we give a computation of the module structure that works as long as a certain vanishing condition holds in the Bredon cohomology of a point. We verify this vanishing condition holds in the case that (V)≥ 3 and G is any of Cp, Cp2 (p a prime), or the symmetric group on three letters.