Articles dans des revues avec comité de lecture (87)
  1. 84. Barnich, G., & Henneaux, M. (1993). Consistent couplings between fields with a gauge freedom and deformations of the master equation. Physics Letters B, 311(1-4), 123-129. doi:10.1016/0370-2693(93)90544-R
  2. 85. Barnich, G., & Henneaux, M. (1992). Comments on Unitarity in the Antifield Formalism. Modern Physics Letters A, 7(29), 2703-2713. doi:10.1142/S0217732392002160
  3. 86. Barnich, G., Constantinescu, R., & Grégoire, P. (1992). BRST-anti-BRST antifield formalism: the example of the Freedman-Townsend model. Physics letters. Section B, 293(3-4), 353-360. doi:10.1016/0370-2693(92)90895-B
  4. 87. Barnich, G., Henneaux, M., & Schomblond, C. (1991). Covariant description of the canonical formalism. Physical Review D - Particles, Fields, Gravitation and Cosmology, 44(4), 939-941. doi:10.1103/PhysRevD.44.R939
    5.   Communications publiées lors de congrès ou colloques nationaux et internationaux (14)
  5. 1. Barnich, G., & Bonte, M. (2021). Soft Degrees of Freedom, Gibbons–Hawking Contribution and Entropy from Casimir Effect. In Quantum Theory and Symmetries: CRM Series in Mathematical Physics (p. 642). (CRM Series in Mathematical Physics). Switzerland: Springer Nature.
  6. 2. Barnich, G., Mao, P., & Ruzziconi, R. (2017). Conserved currents in the Cartan formulation of general relativity. About Various Kinds of Interactions: Proceedings of the Workshop in honour of the 65th birthday of Professor Philippe Spindel (04-05/06/2017: University of Mons)
  7. 3. Barnich, G., Gonzalez, H. A., & Gomberoff, A. (2013). A 2D field theory equivalent to 3D gravity with no cosmological constant. In Spanish Relativity Meeting in Portugal ERE2012: Vol. v60 (pp. 135-138) Springer Proceedings in Mathematics and Statistics,
  8. 4. Barnich, G., & Lambert, P.-H. (2013). A note on the Newman-Unti group and the BMS charge algebra in terms of Newman-Penrose coefficients. In IC-MSQUARE 2012: International Conference on Mathematical Modelling in Physical Sciences: Vol. 410 (p. 012142) Journal of Physics: Conference Series.
  9. 5. Barnich, G., & Lambert, P.-H. (2013). Asymptotic symmetries at null infinity and local conformal properties of spin coefficients. In Proceedings of the conference "QUANTUM FIELD THEORY AND GRAVITY - QFTG'2012": Vol. 13 (pp. 28-30) Tomsk: Tomsk State Pedagogical University Bulletin.
  10. 6. Barnich, G. (2010). A Note on Gauge Systems from the Point of View of Lie Algebroids. AIP Conference Proceedings. Vol. 1307 (DOI: 10.1063/1.3527427 ed., pp. 7-18) 29th workshop on geometric methods in physics(Bialowieza (Poland)).
  11. 7. Barnich, G., & Grigoriev, M. (2006). BRST extension of the non-linear unfolded formalism. In Proceedings of “The 5th International School and Workshop on QFT & Hamiltonian Systems”: Vol. 16 Craiova: Annals of the University of Craiova Physics AUC.
  12. 8. Barnich, G., Bonelli, G., & Grigoriev, M. (2005). From BRST to light-cone description of higher spin gauge fields. In Proceedings of 4th School and Workshop in quantum field theory and Hamiltonian systems: Vol. 15 (pp. 1-10) Craiova: Annals of the University of Craiova, Physics AUC.
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