| Abundance of strange attractors L Mora, M Viana | 463 | 1993 |
| Moser's invariant curves and homoclinic bifurcations L Mora, N Romero Dynamic Systems and Applications 6, 29-42, 1997 | 28 | 1997 |
| Persistence of homoclinic tangencies for area-preserving maps L Mora, N Romero Annales de la Faculté des sciences de Toulouse: Mathématiques 6 (4), 711-725, 1997 | 20 | 1997 |
| Lower bounds for the Hausdorff dimension of the geometric Lorenz attractor: the homoclinic case C Lizana, L Mora Discrete Contin. Dyn. Syst. 22 (3), 699-709, 2008 | 10 | 2008 |
| Homoclinic bifurcations, fat attractors and invariant curves L Mora Discrete and Continuous Dynamical Systems 9 (5), 1133-1148, 2003 | 9 | 2003 |
| Birkhoff-Henon attractors for dissipative perturbations of area-preserving twist maps L Mora Ergodic Theory and Dynamical Systems 14 (4), 807-815, 1994 | 7 | 1994 |
| Homoclinic bifurcations of endomorphisms: The codimension one case L Mora Applied mathematics letters 11 (6), 81-86, 1998 | 4 | 1998 |
| Singer theorem for endomorphisms L Mora Nonlinearity 31 (5), 1833, 2018 | 2 | 2018 |
| A note on the lower bounds for the Hausdorff Dimension of the Geometric Lorenz Attractor L Mora Boletın de la Asociación Matemática Venezolana, 141, 2012 | 2 | 2012 |
| Homoclinic bifurcations and the Floquet torus JC Martin, L Mora Ergodic Theory and Dynamical Systems 20 (4), 1173-1186, 2000 | 2 | 2000 |
| A multidimensional real Schwarz Lemma for the Hilbert metric L Mora Bulletin of the Brazilian Mathematical Society, New Series 42 (1), 25-43, 2011 | 1 | 2011 |
| A complement to the connecting lemma of Hayashi JC Martín, L Mora Nonlinearity 18 (4), 1643, 2005 | 1 | 2005 |
| 𝐶²-perturbations of Hopf’s bifurcation points and homoclinic tangencies J Martín, L Mora Proceedings of the American Mathematical Society 128 (4), 1241-1245, 2000 | 1 | 2000 |
| Diffeomorphisms with infinitely many irrational invariant curves L Mora, B Ruiz Ergodic Theory and Dynamical Systems 31 (5), 1517-1535, 2011 | | 2011 |
| Floquet torus for codimension-s Hopf bifurcation L Mora Bulletin of the Brazilian Mathematical Society, New Series 38, 263-290, 2007 | | 2007 |
| Theorem: Let f∈ Diff3 (M) and let p∈ M be a Hopf bifurcation point of f. Then for all Cr neighborhoods N of f and for all neighborhoods U of p there exists g∈ N exhibiting a … JC Martın, L Mora Proc. Amer. Math. Soc 128 (4), 1241-1245, 2000 | | 2000 |
| On the measure of the set of bounded orbits of the maps: ha, b=(y, 1-ax 2+ by). L Mora | | |
