Equivariant Z/-modules for the cyclic group C2

Abstract

For the cyclic group C2 we give a complete description of the derived category of perfect complexes of modules over the constant Mackey ring Z/, for a prime. This is fairly simple for odd, but for =2 depends on a new splitting theorem. As corollaries of the splitting theorem we compute the associated Picard group and the Balmer spectrum for compact objects in the derived category, and we obtain a complete classification of finite modules over the C2-equivariant Eilenberg--MacLane spectrum HZ/2. We also use the splitting theorem to give new and illuminating proofs of some facts about RO(C2)-graded Bredon cohomology, namely Kronholm's freeness theorem and the structure theorem of C. May.