On braided zeta functions

Abstract

We propose a ribbon braided category approach to zeta-functions in q-deformed geometry. As a proof of concept we compute ζt(Cn) where Cn is viewed as the standard representation in the category of modules of Uq(sln). We show that the same ζt(Cn) is obtained for the n-dimensional representation in the category of Uq(sl2) modules. We show that this implies and is equivalent to the generating function for the decomposition into irreducibles of the symmetric tensor products Sj(V) for V an irreducible representation of sl2. We discuss ζt(Cq(S2)) for the standard q-deformed sphere.