Publications
On $C^1$-robust transitivity of volume-preserving flows. J. Differential Equations. 2008;245:3127-3143.
[2008-24] Are there chaotic maps in the sphere? .
[2015-16] A note on reversibility and Pell equations .Edit
Denseness of ergodicity for a class of volume-preserving flows. Port. Math.. 2011;68:1-17.
A Dichotomy in Area-Preserving Reversible Maps. Qual. Theory Dyn. Syst.. 2016;15(2):309-326.Edit
[2010-8] On the entropy of conservative flows .
Homoclinic tangencies versus uniform hyperbolicity for conservative 3-flows. J. Differential Equations. 2009;247:2913-2923.
[2015-38] Generic Hamiltonian dynamics, .Edit
Contributions to the geometric and ergodic theory of conservative flows. Ergodic Theory Dynam. Systems. 2013;33:1709-1731.
A remark on the topological stability of symplectomorphisms. Appl. Math. Lett.. 2012;25:163-165.
Removing zero Lyapunov exponents in volume-preserving flows. Nonlinearity. 2007;20:1007-1016.
Three-dimensional conservative star flows are Anosov. Discrete Contin. Dyn. Syst.. 2010;26:839-846.
Generic Hamiltonian dynamics. J. Dynam. Differential Equations. 2017;29:203-218.Edit
Hyperbolicity and stability for Hamiltonian flows. J. Differential Equations. 2013;254:309-322.Edit
On the fundamental regions of a fixed point free conservative Hénon map. Bull. Aust. Math. Soc.. 2008;77:37-48.