Height h detection and connective real k-theory of elementary abelian 2-groups

Abstract

In this paper, we determine the connective K-cohomology with reality of elementary abelian 2-groups as a module over Z[v1,a], where v1 is the equivariant Bott class and a the Euler class of the sign representation. This gives in particular a new approach to the computation of the connective real K-theory of such groups. The originality here is to make all computations in the Z/2-equivariant stable category, considering only Z/2-equivariant cohomology theories, and to use relative homological algebra over certain subalgebras of the equivariant Steenrod algebra to perform explicit computations.