Caractérisation des flots d'Anosov en dimension 3 par leurs feuilletages faibles T Barbot Ergodic Theory and Dynamical Systems 15 (2), 247-270, 1995 | 108 | 1995 |
Notes on a paper of Mess L Andersson, T Barbot, R Benedetti, F Bonsante, WM Goldman, ... Geometriae Dedicata 126, 47-70, 2007 | 92 | 2007 |
Globally hyperbolic flat space–times T Barbot Journal of Geometry and Physics 53 (2), 123-165, 2005 | 73 | 2005 |
A primer on the (2+ 1) Einstein universe T Barbot, V Charette, T Drumm, WM Goldman, K Melnick Recent developments in pseudo-Riemannian geometry, ESI Lect. Math. Phys, 179-229, 2008 | 70 | 2008 |
Constant Mean Curvature Foliations of Globally Hyperbolic Spacetimes Locally Modelled on AdS 3 T Barbot, F Béguin, A Zeghib Geometriae Dedicata 126, 71-129, 2007 | 70 | 2007 |
Prescribing Gauss curvature of surfaces in 3-dimensional spacetimes application to the Minkowski problem in the Minkowski space T Barbot, F Béguin, A Zeghib Annales de l'Institut Fourier 61 (2), 511-591, 2011 | 56 | 2011 |
Flots d'Anosov sur les variétés graphées au sens de Waldhausen T Barbot Annales de l'institut Fourier 46 (5), 1451-1517, 1996 | 54 | 1996 |
Three-dimensional Anosov flag manifolds T Barbot Geometry & Topology 14 (1), 153-191, 2010 | 49 | 2010 |
Géométrie transverse des flots d'Anosov T Barbot Lyon 1, 1992 | 48 | 1992 |
Pseudo-Anosov flows in toroidal manifolds T Barbot, SR Fenley Geometry & Topology 17 (4), 1877-1954, 2013 | 44 | 2013 |
Causal properties of AdS-isometry groups I: Causal actions and limit sets T Barbot | 42 | 2008 |
Anosov AdS representations are quasi-Fuchsian Q Mérigot, T Barbot Groups, Geometry, and Dynamics 6 (3), 441-483, 2012 | 41 | 2012 |
Generalizations of the Bonatti–Langevin example of Anosov flow and their classification up to topological equivalence T Barbot Communications in Analysis and Geometry 6 (4), 749-798, 1998 | 41 | 1998 |
Deformations of Fuchsian AdS representations are quasi-Fuchsian T Barbot Journal of Differential Geometry 101 (1), 1-46, 2015 | 39 | 2015 |
Cosmological time versus CMC time in spacetimes of constant curvature L Andersson, T Barbot, F Béguin, A Zeghib | 36 | 2012 |
Collisions of particles in locally AdS spacetimes I. Local description and global examples T Barbot, F Bonsante, JM Schlenker Communications in mathematical physics 308 (1), 147-200, 2011 | 35 | 2011 |
Plane affine geometry and Anosov flows T Barbot Annales Scientifiques de l’Ecole Normale Supérieure 34 (6), 871-889, 2001 | 31 | 2001 |
Mise en position optimale de tores par rapport à un flot d'Anosov T Barbot Commentarii mathematici Helvetici 70, 113-160, 1995 | 31 | 1995 |
Causal properties of AdS-isometry groups II: BTZ multi-black-holes T Barbot | 29 | 2008 |
Some open questions on anti-de sitter geometry T Barbot, F Bonsante, J Danciger, WM Goldman, F Guéritaud, F Kassel, ... arXiv preprint arXiv:1205.6103, 2012 | 28 | 2012 |