Articles dans des revues avec comité de lecture (257)
81.
Henneaux, M., Martínez, C., Troncoso, R., & Zanelli, J. (2006). Asymptotic behavior and Hamiltonian analysis of anti-de Sitter gravity coupled to scalar fields. Annals of Physics, 322(4), 824-848. doi:10.1016/j.aop.2006.05.002
82.
Henneaux, M., Leston, M., Persson, D., & Spindel, P. (2006). Geometric Configurations, Regular Subalgebras of E(10) and M-Theory Cosmology. The Journal of high energy physics, 10. doi:10.1088/1126-6708/2006/10/021
83.
Henneaux, M. (2006). Gravity, hyperbolic billiards and Lorentzian Kac-Moody algebras. AIP Conference Proceedings, 861, 127-134. doi:10.1063/1.2399573
84.
Henneaux, M., Leston, M., Persson, D., & Spindel, P. (2006). A special class of rank 10 and 11 Coxeter groups. Journal of Mathematical Physics, 48(5). doi:10.1063/1.2738754
85.
De Buyl, S., Henneaux, M., & Paulot, L. (2006). Extended E8 invariance of 11-dimensional supergravity. The Journal of high energy physics, 2, 056, 1-10. doi:10.1088/1126-6708/2006/02/056
86.
Henneaux, M., Fuster, A., & Maas, A. (2005). BRST-antifield quantization: a short review. International Journal of Geometric Methods in Modern Physics, 2(5), 939-964. doi:10.1142/S0219887805000892
87.
De Buyl, S., Henneaux, M., & Paulot, L. (2005). Hidden symmetries and Dirac fermions. Classical and Quantum Gravity, 22(17), 3595-3622. doi:10.1088/0264-9381/22/17/018
88.
Henneaux, M., Gomberoff, A., & Teitelboim, C. (2005). Decay of the cosmological constant: Equivalence of quantum tunneling and thermal activation in two spacetime dimensions. Physical review. D, Particles and fields, 71(6). doi:10.1103/PhysRevD.71.063509
89.
Englert, F., Henneaux, M., & Houart, L. (2005). From very-extended to overextended gravity and M-theories. The Journal of high energy physics,(2), 1705-1725.
90.
Cnockaert, S., & Henneaux, M. (2005). Lovelock terms and BRST cohomology. Classical and Quantum Gravity, 22(13), 2797-2810. doi:10.1088/0264-9381/22/13/017
91.
Henneaux, M., & Teitelboim, C. (2004). Duality in linearized gravity. Physical review. D, Particles and fields, 71(2). doi:10.1103/PhysRevD.71.024018
92.
Henneaux, M., Buffenoir, E., Noui, K., & Roche, P. (2004). Hamiltonian analysis of Plebanski theory. Classical and Quantum Gravity, 21(22), 5203-5220. doi:10.1088/0264-9381/21/22/012