http://orcid.org/0000-0003-2234-4624
References
- Baez, J. C., Lauda, A. D. (2004). Higher-dimensional algebra. V. 2-groups. Theory Appl. Categ. 12:423–491.
- Dijkgraaf, R., Pasquier, V., Roche, P. (1990). Quasi Hopf algebras, group cohomology and orbifold models. Nuclear Phys. B Proc. Suppl., 18B:60–72 [Recent advances in field theory (Annecy-le-Vieux, 1990)].
- Etingof, P., Nikshych, D., Ostrik, V (2005). On fusion categories. Ann. Math. (2), 162(2):581–642.
- Etingof, P., Nikshych, D., Ostrik, V (2011). Weakly group-theoretical and solvable fusion categories. Adv. Math. 226(1):176–205.
- Goff, C., Mason, G., Ng, S.-H (2007). On the gauge equivalence of twisted quantum doubles of elementary abelian and extra-special 2-groups. J. Algebra 312(2):849–875.
- Mason, C., Ng, S.-H (2001). Group cohomology and gauge equivalence of some twisted quantum doubles. Trans. Am. Math. Soc. 353(9):3465–3509.
- Müger, M. (2003). From subfactors to categories and topology. I. Frobenius algebras in and Morita equivalence of tensor categories. J. Pure Appl. Algebra 180(1–2):81–157.
- Muñoz, A. (2017). Clasificación de categorías de fusión punteadas de dimensión 8 hasta equivalencia Morita. Master Thesis. Universidad del Norte, Barranquilla, Colombia.
- Naidu, D. (2007). Categorical Morita equivalence for group-theoretical categories. Commun. Algebra 35(11):3544–3565.
- Ostrik, V. (2003). Module categories over the Drinfeld double of a finite group. Int. Math. Res. Not. (27):1507–1520.
- Uribe, B. (2017). On the classification of pointed fusion categories up to weak Morita equivalence. Pac. J. Math. 290(2):437–466.