FI-calculus and representation stability

Abstract

We introduce a functor calculus for functors FI, which we call FI-objects, for FI the category of finite sets and injections and V a stable presentable ∞-category. We show that n-homogeneous FI-objects are classified by representations of Sn in V, allowing us to associate "Taylor coefficients" to an FI-object. We show that these Taylor coefficients, in aggregate, themselves carry the structure of an FI-object, and we show that, up to the vanishing of certain Tate constructions, "analytic" FI-objects can be recovered from their FI-object of Taylor coefficients. We then establish a close relationship between our FI-calculus and the phenomenon of representation stability for FI-modules, suggesting that FI-calculus be understood as the extension of representation stability to the ∞-categorical setting. In this context, we show how representation-theoretic information about a representation stable FI-module can be read off from its FI-module of Taylor coefficients.