The Balmer spectrum of the equivariant homotopy category of a finite abelian group

Abstract

For a finite abelian group A, we determine the Balmer spectrum of SpAω, the compact objects in genuine A-spectra. This generalizes the case A=Z/pZ due to Balmer and Sanders Balmer-Sanders, by establishing (a corrected version of) their logp-conjecture for abelian groups. We also work out the consequences for the chromatic type of fixed-points and establish a generalization of Kuhn's blue-shift theorem for Tate-constructions kuhn.