English

Braid Rigidity for Path Algebras

Quantum Algebra 2020-01-31 v1 Category Theory Representation Theory

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 BnB_n for all nNn\in \N. We say that such representations are rigid if they are determined by the path algebra and the representations of B2B_2. We show that besides the known classical cases also the braid representations for the path algebra for the 7-dimensional representation of G2G_2 satisfies the rigidity condition, provided B3B_3 generates \End(V3)\End(V^{\otimes 3}). We obtain a complete classification of ribbon tensor categories with the fusion rules of \g(G2)\g(G_2) if this condition is satisfied.

Keywords

Cite

@article{arxiv.2001.11440,
  title  = {Braid Rigidity for Path Algebras},
  author = {Lilit Martirosyan and Hans Wenzl},
  journal= {arXiv preprint arXiv:2001.11440},
  year   = {2020}
}
R2 v1 2026-06-23T13:25:26.887Z