A model for normed algebras in rational G-spectra

Abstract

For a finite group G, we construct a simplified model for the G-symmetric monoidal G-∞-category of rational G-spectra. Using this model, we classify I-normed algebras in rational G-spectra for a given indexing system I. We show that such an algebra is equivalently described as a collection \X(G/H)\(H≤ G) of commutative algebras in nonequivariant rational spectra, indexed by conjugacy classes of subgroups of G, together with compatible morphisms of commutative algebras X(G/K)X(G/H) whenever K≤ H and the induced map G/KG/H is in I. This generalizes a result by Wimmer arXiv:1905.12420.