Equivariant operads, symmetric sequences, and Boardman-Vogt tensor products

Abstract

We advance the foundational study of be Nardin-Shah's ∞-category of G-operads and their associated ∞-categories of algebras. In particular, we construct the underlying G-symmetric sequence of a (one color) G-operad, yielding a monadic functor; we use this to lift Bonventre's genuine operadic nerve to a conservative functor of ∞-categories, restricting to an equivalence between categories of discrete G-operads. Using this, we extend Blumberg-Hill's program concerning N∞-operads to arbitrary sub-operads of the terminal G-operad, which we show are equivalent to weak indexing systems. We then go on to define and characterize a homotopy-commutative and closed Boardman-Vogt tensor product on OpG; in particular, this specializes to a G-symmetric monoidal ∞-category of O-algebras in a G-symmetric monoidal ∞-category whose P-algebras are objects with interchanging O-algebra and P-algebra structures.