The Rosick\'y Tangent Categories of Algebras over an Operad

TL;DR

This paper extends tangent category theory to operads, showing that categories of operad algebras and their opposites form tangent categories, providing new examples and connections in differential and algebraic geometry.

Contribution

It establishes that algebra categories over operads and their opposites are tangent categories, introducing new structures and methods for constructing tangent and Cartesian differential categories from operads.

Findings

Categories of operad algebras are tangent categories

Opposite categories of operad algebras are tangent categories

Operads generate new examples of tangent and Cartesian differential categories

Abstract

Tangent categories provide a categorical axiomatization of the tangent bundle. There are many interesting examples and applications of tangent categories in a variety of areas such as differential geometry, algebraic geometry, algebra, and even computer science. The purpose of this paper is to expand the theory of tangent categories in a new direction: the theory of operads. The main result of this paper is that both the category of algebras of an operad and its opposite category are tangent categories. The tangent bundle for the category of algebras is given by the semi-direct product, while the tangent bundle for the opposite category of algebras is constructed using the module of K\"ahler differentials, and these tangent bundles are in fact adjoints of one another. To prove these results, we first prove that the category of algebras of a coCartesian differential monad is a tangent category. We then show that the monad associated to any operad is a coCartesian differential monad. This also implies that we can construct Cartesian differential categories from operads. Therefore, operads provide a bountiful source of examples of tangent categories and Cartesian differential categories, which both recaptures previously known examples and also yield new interesting examples. We also discuss how certain basic tangent category notions recapture well-known concepts in the theory of operads.