Algebraic theories and commutativity in a sheaf topos

Abstract

For any site of definition C of a Grothendieck topos E, we define a notion of a C-ary Lawvere theory τ: C T whose category of models is a stack over E. Our definitions coincide with Lawvere's finitary theories when C=0 and E = Set. We construct a fibered category Mod T of models as a stack over E and prove that it is E-complete and E-cocomplete. We show that there is a free-forget adjunction F U: Mod T E. If τ is a commutative theory in a certain sense, then we obtain a ``locally monoidal closed'' structure on the category of models, which enhances the free-forget adjunction to an adjunction of symmetric monoidal E-categories. Our results give a general recipe for constructing a monoidal E-cosmos in which one can do enriched E-category theory. As an application, we describe a convenient category of linear spaces generated by the theory of Lebesgue integration.