Hopf Algebroids, Bimodule Connections and Noncommutative Geometry

Abstract

We construct new examples of left bialgebroids and Hopf algebroids, arising from noncommutative geometry. Given a first order differential calculus on an algebra A, with the space of left vector fields X, we construct a left A-bialgeroid BX, whose category of left modules is isomorphic to the category of left bimodule connections over the calculus. When is a pivotal bimodule, we construct a Hopf algebroid HX over A, by restricting to a subcategory of bimodule connections which intertwine with both and X in a compatible manner. Assuming the space of 2-forms 2 is pivotal as well, we construct the corresponding Hopf algebroid DX for flat bimodule connections, and recover Lie-Rinehart Hopf algebroids as a quotient of our construction in the commutative case. We use these constructions to provide explicit examples of Hopf algebroids over noncommutative bases.