Topological defects in CFT

[1]  V. Petkova On the crossing relation in the presence of defects , 2009, 0912.5535.

[2]  L. Alday,et al.  Loop and surface operators in $ \mathcal{N} = 2 $ gauge theory and Liouville modular geometry , 2009, 0909.0945.

[3]  L. Alday,et al.  Liouville Correlation Functions from Four-Dimensional Gauge Theories , 2009, 0906.3219.

[4]  N. Drukker,et al.  Gauge theory loop operators and Liouville theory , 2009, 0909.1105.

[5]  G. Sarkissian Defects and Permutation branes in the Liouville field theory , 2009, 0903.4422.

[6]  A. Alekseev,et al.  Quantization of Wilson loops in Wess-Zumino-Witten models , 2007, hep-th/0702174.

[7]  J. Fuchs,et al.  DUALITY AND DEFECTS IN RATIONAL CONFORMAL FIELD THEORY , 2006, hep-th/0607247.

[8]  C. Bachas,et al.  Loop operators and the Kondo problem , 2004, hep-th/0411067.

[9]  J. Zuber,et al.  The many faces of Ocneanu cells , 2001, hep-th/0101151.

[10]  J. Zuber,et al.  Generalised twisted partition functions , 2000, hep-th/0011021.

[11]  J. Teschner,et al.  Clebsch–Gordan and Racah–Wigner Coefficients for a Continuous Series of Representations of ?q (??(2, ℝ)) , 2000, math/0007097.

[12]  G. Bòhm,et al.  A coassociativeC*-quantum group with nonintegral dimensions , 1995, q-alg/9509008.

[13]  J. Cardy Boundary conditions, fusion rules and the Verlinde formula , 1989 .

[14]  J. Cardy Effect of boundary conditions on the operator content of two-dimensional conformally invariant theories , 1986 .

[15]  J. Zuber Discrete Symmetries of Conformal Theories , 1986 .