Composition of bispans of G-sets and plethysm

Abstract

Let P(G) be the Grothendieck ring of the semiring of endomorphisms of the point in the 1-category of bispans of finite G-sets for a finite group G. This is the bispan analogue of the Burnside ring of G. The ring P(G) admits a third operation from composition of bispans. We produce a character map for P(G) landing in a plethory built out of polynomial rings and the poset of conjugacy classes of subgroups of G. We prove that the character map sends composition of bispans to the plethysm operation -- which is a generalization of composition of polynomials.