Pseudolimits for Tangent Categories with Applications to Equivariant Algebraic and Differential Geometry

Abstract

In this paper we show that if C is a category and if FCop Cat is a pseudofunctor such that for each object X of C the category F(X) is a tangent category and for each morphism f of C the functor F(f) is part of a strong tangent morphism (F(f),fα) and that furthermore the natural transformations fα vary pseudonaturally in Cop, then there is a tangent structure on the pseudolimit PC(F) which is induced by the tangent structures on the categories F(X) together with how they vary through the functors F(f). We use this observation to show that the forgetful 2-functor Forget:Tan Cat creates and preserves pseudolimits indexed by 1-categories. As an application, this allows us to describe how equivariant descent interacts with the tangent structures on the category of smooth (real) manifolds and on various categories of (algebraic) varieties over a field.