The Structure of the Grothendieck Rings of Wreath Product Deligne Categories and their Generalisations

Abstract

Given a tensor category C over an algebraically closed field of characteristic zero, we may form the wreath product category Wn(C). It was shown in Ryba that the Grothendieck rings of these wreath product categories stabilise in some sense as n ∞. The resulting "limit" ring, G∞Z(C), is isomorphic to the Grothendieck ring of the wreath product Deligne category St(C) as defined by Mori. This ring only depends on the Grothendieck ring G(C). Given a ring R which is free as a Z-module, we construct a ring G∞Z(R) which specialises to G∞Z(C) when R = G(C). We give a description of G∞Z(R) using generators very similar to the basic hooks of Nate. We also show that G∞Z(R) is a λ-ring wherever R is, and that G∞Z(R) is (unconditionally) a Hopf algebra. Finally we show that G∞Z(R) is isomorphic to the Hopf algebra of distributions on the formal neighbourhood of the identity in (WZ R)×, where W is the ring of Big Witt Vectors.