Neurology Mathematics Ideas140.pdf - [FuSV J Fuchs C Schweigert and A Valentino Bicategories for boundary conditions and for surface defects in 3-d TFT

Neurology Mathematics Ideas140.pdf - [FuSV J Fuchs C...

This preview shows page 1 out of 1 page.

[FuSV] J. Fuchs, C. Schweigert, and A. Valentino, Bicategories for boundary conditions and for surface defects in 3-d TFT , Commun. Math. Phys. 321 (2013) 543–575 [hep-th/1203.4568] [GeNN] S. Gelaki, D. Naidu, and D. Nikshych, Centers of graded fusion categories , Algebra & Number Theory 3 (2009) 959–990 [math.QA/0905.3117] [Gi] G. Ginot, Notes on factorization algebras, factorization homology and applications , in: Math- ematical Aspects of Quantum Field Theories , D. Calaque and Th. Strobl, eds. (Springer Verlag, Berlin 2015), p. 429–552 [math.AT/1307.5213] [KK] A. Kitaev and L. Kong, Models for gapped boundaries and domain walls , Commun. Math. Phys. 313 (2012) 351–373 [cond-mat/1104.5047] [Ko] J. Kock, Frobenius Algebras and 2D Topological Quantum Field Theories (Cambridge Uni- versity Press, Cambridge 2003) [Ku] G. Kuperberg, Non-involutory Hopf algebras and three-manifold invariants , Duke Math. J. 84 (1996) 83–129 [LP] A.D. Lauda and H. Pfeiffer, Open-closed strings: Two-dimensional extended TQFTs and
Image of page 1

You've reached the end of your free preview.

Want to read the whole page?

  • Fall '17

  • Left Quote Icon

    Student Picture

  • Left Quote Icon

    Student Picture

  • Left Quote Icon

    Student Picture