Skein-Theoretic Methods for Unitary Fusion Categories

Abstract

Unitary fusion categories (UFCs) have gained increased attention due to emerging connections with quantum physics. We consider a fusion rule of the form q q 1ki=1xi in a UFC C, and extract information using the graphical calculus. For instance, we classify all associated skein relations when k=1,2 and C is ribbon. In particular, we also consider the instances where q is antisymmetrically self-dual. Our main results follow from considering the action of a rotation operator on a "canonical basis". Assuming self-duality of the summands xi, some general observations are made e.g. the real-symmetricity of the F-matrix Fqqqq. We then find explicit formulae for Fqqqq when k=2 and C is ribbon, and see that the spectrum of the rotation operator distinguishes between the Kauffman and Dubrovnik polynomials.