Braid Rigidity for Path Algebras

Abstract

Path algebras are a convenient way of describing decompositions of tensor powers of an object in a tensor category. If the category is braided, one obtains representations of the braid groups Bn for all n∈ . We say that such representations are rigid if they are determined by the path algebra and the representations of B2. We show that besides the known classical cases also the braid representations for the path algebra for the 7-dimensional representation of G2 satisfies the rigidity condition, provided B3 generates (V 3). We obtain a complete classification of ribbon tensor categories with the fusion rules of (G2) if this condition is satisfied.