2-dimensional Lawvere theories, commutativity, and higher Day convolution

Abstract

The aim of this paper is to study categorified algebraic structures and their pseudo- and lax homomorphisms using the framework of Lawvere 2-theories, and more generally, (enhanced) 2-dimensional sketches. The key notion we focus on is that of 2-dimensional commutativity. As one of the main results, we prove that if a Lawvere 2-theory T is equipped with such a structure, then the 2-category Modl(T,Cat) of T-models, lax homomorphisms, and modifications admits a natural structure of a closed 2-multicategory. From this, we deduce a generalization of Fox's theorem. We also discuss the analogue in the higher setting for Lawvere (∞,2)-theories. As a result of independent interest, we construct a multicategory (or ∞-operad) structure on the hom-category HomV(M,N), where V is a monoidal (∞,2)-category and M,N are monoids therein.