The Picard group of the category of Cn-equivariant stable homotopy theory

Abstract

For a finite group G, there is a map RO(G) Pic(SpG) from the real representation ring of G to the Picard group of G-spectra. This map is not known to be surjective in general, but we prove that when G is cyclic this map is indeed surjective and in that case we describe Pic(SpG) explicitly. We also show that for an arbitrary finite group G homology and cohomology with coefficients in a cohomological Mackey functor do not see the part of Pic(SpG) coming from the Picard group of the Burnside ring. Hence these homology and cohomology calculations can be graded on a smaller group.