FI-calculus and representation stability
Abstract
We introduce a functor calculus for functors , which we call -objects, for the category of finite sets and injections and a stable presentable -category. We show that -homogeneous -objects are classified by representations of in , allowing us to associate "Taylor coefficients" to an -object. We show that these Taylor coefficients, in aggregate, themselves carry the structure of an -object, and we show that, up to the vanishing of certain Tate constructions, "analytic" -objects can be recovered from their -object of Taylor coefficients. We then establish a close relationship between our -calculus and the phenomenon of representation stability for -modules, suggesting that -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 -module can be read off from its -module of Taylor coefficients.
Keywords
Cite
@article{arxiv.2306.13597,
title = {FI-calculus and representation stability},
author = {Kaya Arro},
journal= {arXiv preprint arXiv:2306.13597},
year = {2023}
}