On the Coefficients of (Z/p)n-Equivariant Ordinary Cohomology with Coefficients in Z/p

Abstract

This note contains a generalization to p>2 of the authors' previous calculations of the coefficients of (Z/2)n-equivariant ordinary cohomology with coefficients in the constant Z/2-Mackey functor. The algberaic results by S.Kriz allow us to calculate the coefficients of the geometric fixed point spectrum (Z/p)nHZ/p, and more generally, the Z-graded coefficients of the localization of HZ/p(Z/p)n by inverting any chosen set of embeddings S0→ Sαi where αi are non-trivial irreducible representations. We also calculate the RO(G)+-graded coefficients of HZ/p(Z/p)n, which means the cohomology of a point indexed by an actual (not virtual) representation. (This is the "non-derived" part, which has a nice algebraic description.)