Encoding Equivariant Commutativity via Operads

Abstract

In this paper, we prove a conjecture of Blumberg and Hill regarding the existence of N∞-operads associated to given sequences F = (Fn)n ∈ N of families of subgroups of G× n. For every such sequence, we construct a model structure on the category of G-operads, and we use these model structures to define E∞F-operads, generalizing the notion of an N∞-operad, and to prove the Blumberg-Hill conjecture. We then explore questions of admissibility, rectification, and preservation under left Bousfield localization for these E∞F-operads, obtaining some new results as well for N∞-operads.