Endomorphisms of the symmetric 2-rig of finite sets
Abstract
Let FSet be the groupoid of finite sets and bijections between them equipped with the canonical symmetric rig category structure given by the disjoint union and the cartesian product of finite sets. We prove that the category (in fact, groupoid) of endomorphisms of FSet is equivalent to the terminal category, thus providing some evidence that FSet is the right categorical analog of the commutative rig N of nonnegative integers. This is shown using a particular semistrict skeletal version of FSet for which the endomorphisms can be described very explicitly.
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