F. Bais and P. Bouwknegt, A classification of subgroup truncations of the bosonic string Nucl Phys, p.561, 1987.

J. Böckenhauer and D. Evans, Modular invariants from subfactors, pp.267-289, 2000.
DOI : 10.1090/conm/294/04971

J. Böckenhauer and D. Evans, Modular invariants graphs and ? induction for nets of subfactors II Commun Math Phys, pp.57-103, 0200.

G. Böhm and K. Szlachányi, A coassociative C * -quantum group with non-integral dimensions Lett Math Phys 38, pp.437-456, 1996.

R. Coquereaux and G. Schieber, Twisted partition functions for ADE boundary conformal field theories and Ocneanu algebras of quantum symmetries J of Geom and Phys, pp.1-43, 2002.

R. Coquereaux and G. Schieber, Determination of quantum symmetries for higher ADE systems from the modular T matrix J of Math Phys, pp.3809-3837, 2003.

R. Coquereaux and R. Trinchero, On quantum symmetries of ADE graphs Adv in Theor and, Math Phys, vol.8, issue.1, 2004.

R. Coquereaux and G. Schieber, Orders and dimensions for sl(2) or sl(3) module categories and boundary conformal field theories on a torus, Journal of Mathematical Physics, vol.48, issue.4, p.43511, 2007.
DOI : 10.1063/1.2714000
URL : https://hal.archives-ouvertes.fr/hal-00110016

D. Francesco, P. Zuber, and J. , (N )-lattice integrable models associated with graphs Nucl Phys B338 p 602, 1990.

J. Fuchs, I. Runkel, and C. Schweigert, TFT construction of RCFT correlators I: partition functions, Nuclear Physics B, vol.646, issue.3, pp.353-497, 2002.
DOI : 10.1016/S0550-3213(02)00744-7

T. Gannon, The classification of affine su(3) modular invariant partition functions Commun Math Phys, pp.233-263, 1992.

T. Gannon, The classification of SU(3) modular invariants revisited Annales de l'Institut Poincaré Phys Theor, pp.15-55, 1992.

P. Goddard, W. Nahm, and D. Olive, Symmetric spaces Sugawara's energy momentum tensor in two dimensions and free fermions Phys Lett 160B pp, pp.111-116, 1985.

D. Hammaoui, G. Schieber, and E. Tahri, Higher Coxeter graphs associated to affine su(3) modular invariants J Phys A38 pp, pp.8259-8286, 2005.
DOI : 10.1088/0305-4470/38/38/007

E. Isasi and G. Schieber, From modular invariants to graphs: the modular splitting method, Journal of Physics A: Mathematical and Theoretical, vol.40, issue.24, pp.6513-6537, 2007.
DOI : 10.1088/1751-8113/40/24/016
URL : https://hal.archives-ouvertes.fr/hal-00098045

V. Kac and D. Peterson, Infinite dimensional Lie algebras, theta functions, and modular forms Adv, 1984.

V. Kac and M. Wakimoto, Modular and conformal invariance constraints in representation theory of affine algebras, Advances in Mathematics, vol.70, issue.2, p.156, 1988.
DOI : 10.1016/0001-8708(88)90055-2

D. Nikshych and . Vainerman, Finite quantum groupo¨?dsgroupo¨?ds and their applications in New directions in Hopf algebras Math Sci Res Inst Publ 43 pp 211-262 Cambridge Univ Press Cambridge, 2002.

D. Nikshych, V. Turaev, and L. Vainerman, Invariant of knots and 3-manifolds from quantum groupo¨?dsgroupo¨?ds Topology and its Applications 127 no 1-2, pp.91-123, 2003.

F. Nill, Axioms for weak bialgebras, 1998.

A. Ocneanu, The Classification of subgroups of quantum SU(N) Lectures at Bariloche Summer School Argentina AMS Contemporary Mathematics, 2000.

V. Ostrik, Module categories weak Hopf algebras and modular invariants Transformation groups 8 no, pp.177-206, 2003.

V. Petkova and J. Zuber, From CFT to graphs, Nuclear Physics B, vol.463, issue.1, pp.161-193, 1996.
DOI : 10.1016/0550-3213(95)00670-2
URL : http://doi.org/10.1016/0550-3213(95)00670-2

A. N. Schellekens and S. Yankielowicz, SIMPLE CURRENTS, MODULAR INVARIANTS AND FIXED POINTS, International Journal of Modern Physics A, vol.05, issue.15, p.2903, 1990.
DOI : 10.1142/S0217751X90001367

G. Schieber, algèbre des symétries quantiques d'Ocneanu et la classification des systèmes conformesàconformesà 2D PhD thesis in French or in Portuguese, UP and Rio de Janeiro: UFRJ), 2003.