Orbital categories and weak indexing systems

Abstract

We initiate the combinatorial study of the poset wIndexT of weak T-indexing systems, consisting of composable collections of arities for T-equivariant algebraic structures, where T is an orbital ∞-category, such as the orbit category of a finite group. In particular, we show that these are equivalent to weak T-indexing categories and characterize various unitality conditions. Within this sits a natural generalization IndexT ⊂ wIndexT of Blumberg-Hill's indexing systems, consisting of arities for structures possessing binary operations and unit elements. We characterize the relationship between the posets of unital weak indexing systems and indexing systems, the latter remaining isomorphic to transfer systems on this level of generality. We use this to characterize the poset of unital Cpn-weak indexing systems.