Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
8904183 | Topology and its Applications | 2018 | 53 Pages |
Abstract
In this paper, we consider abelian functor calculus, the calculus of functors of abelian categories established by the second author and McCarthy. We carefully construct a category of abelian categories and suitably homotopically defined functors, and show that this category, equipped with the directional derivative, is a cartesian differential category in the sense of Blute, Cockett, and Seely. This provides an abstract framework that makes certain analogies between classical and functor calculus explicit. Inspired by Huang, Marcantognini, and Young's chain rule for higher order directional derivatives of functions, we define a higher order directional derivative for functors of abelian categories. We show that our higher order directional derivative is related to the iterated partial directional derivatives of the second author and McCarthy by a Faà di Bruno style formula. We obtain a higher order chain rule for our directional derivatives using a feature of the cartesian differential category structure, and with this provide a formulation for the nth layers of the Taylor tower of a composition of functors FâG in terms of the derivatives and directional derivatives of F and G, reminiscent of similar formulations for functors of spaces or spectra by Arone and Ching. Throughout, we provide explicit chain homotopy equivalences that tighten previously established quasi-isomorphisms for properties of abelian functor calculus.
Related Topics
Physical Sciences and Engineering
Mathematics
Geometry and Topology
Authors
Kristine Bauer, Brenda Johnson, Christina Osborne, Emily Riehl, Amelia Tebbe,