The groupoid of finite sets is biinitial in the 2-category of rig categories

Abstract

The groupoid of finite sets has a "canonical" structure of a symmetric 2-rig with the sum and product respectively given by the coproduct and product of sets. This 2-rig FS et is just one of the many non-equivalent categorifications of the commutative rig N of natural numbers, together with the rig N itself viewed as a discrete rig category, the whole category of finite sets, the category of finite dimensional vector spaces over a field k, etc. In this paper it is shown that FS et is the right categorification of N in the sense that it is biinitial in the 2-category of rig categories, in the same way as N is initial in the category of rigs. As a by-product, an explicit description of the homomorphisms of rig categories from a suitable version of FS et into any (semistrict) rig category S is obtained in terms of a sequence of automorphisms of the objects 1+n)·s+1 in S for each n≥ 0.