English

Derivations in Codifferential Categories

Category Theory 2015-05-04 v1 Commutative Algebra Logic

Abstract

Derivations provide a way of transporting ideas from the calculus of manifolds to algebraic settings where there is no sensible notion of limit. In this paper, we consider derivations in certain monoidal categories, called codifferential categories. Differential categories were introduced as the categorical framework for modelling differential linear logic. The deriving transform of a differential category, which models the differentiation inference rule, is a derivation in the dual category. We here explore that derivation's universality. One of the key structures associated to a codifferential category is an algebra modality. This is a monad TT such that each object of the form TCTC is canonically an associative, commutative algebra. Consequently, every TT-algebra has a canonical commutative algebra structure, and we show that universal derivations for these algebras can be constructed quite generally. It is a standard result that there is a bijection between derivations from an associative algebra AA to an AA-module MM and algebra homomorphisms over AA from AA to AMA\oplus M, with AMA\oplus M being considered as an infinitesimal extension of AA. We lift this correspondence to our setting by showing that in a codifferential category there is a canonical TT-algebra structure on AMA\oplus M. We call TT-algebra morphisms from TATA to this TT-algebra structure Beck TT-derivations. This yields a novel, generalized notion of derivation. The remainder of the paper is devoted to exploring consequences of that definition. Along the way, we prove that the symmetric algebra construction in any suitable symmetric monoidal category provides an example of codifferential structure, and using this, we give an alternative definition for differential and codifferential categories.

Keywords

Cite

@article{arxiv.1505.00220,
  title  = {Derivations in Codifferential Categories},
  author = {Richard Blute and Rory B. B. Lucyshyn-Wright and Keith O'Neill},
  journal= {arXiv preprint arXiv:1505.00220},
  year   = {2015}
}

Comments

25 Pages

R2 v1 2026-06-22T09:26:42.285Z