[2008-3] Bessa M, Dias JL. Hamiltonian elliptic dynamics on symplectic 4-manifolds .Edit

Bessa M. Homeomorfismos do plano sem pontos fixos 2005.

Bessa M, Rocha J. Homoclinic tangencies versus uniform hyperbolicity for conservative 3-flows. J. Differential Equations. 2009;247:2913-2923.

[2010-8] Bessa M, Varandas P. On the entropy of conservative flows .

[2007-5] Bessa M, Rocha J. Denseness of ergodicity for a class of partially hyperbolic volume-preserving flows .Edit

[2014-8] Bessa M, Rodrigues A. A dichotomy in area-preserving reversible maps .Edit

Bessa M, Rocha J. A remark on the topological stability of symplectomorphisms. Appl. Math. Lett.. 2012;25:163-165.

Bessa M, Rocha J. Removing zero Lyapunov exponents in volume-preserving flows. Nonlinearity. 2007;20:1007-1016.

Bessa M, Rodrigues AA. Dynamics of conservative Bykov cycles: tangencies, generalized Cocoon bifurcations and elliptic solutions. J. Differential Equations. 2016;261(2):1176-1202.Edit

Bessa M, Rocha J. Three-dimensional conservative star flows are Anosov. Discrete Contin. Dyn. Syst.. 2010;26:839-846.

[2014-7] Bessa M, Carvalho M, Rodrigues A. Generic area-preserving reversible diffeomorphisms .Edit

[2015-16] Bessa M, Rodrigues AA. A note on reversibility and Pell equations .Edit

Bessa M, Rocha J, Torres MJ. Hyperbolicity and stability for Hamiltonian flows. J. Differential Equations. 2013;254:309-322.Edit

Bessa M, Rocha J. On the fundamental regions of a fixed point free conservative Hénon map. Bull. Aust. Math. Soc.. 2008;77:37-48.

Bessa M, Rodrigues A. A Dichotomy in Area-Preserving Reversible Maps. Qual. Theory Dyn. Syst.. 2016;15(2):309-326.Edit

[2006-36] Bessa M, Rocha J. Removing zero Lyapunov exponents in volume-preserving flows .Edit

Bessa M, Ferreira C, Rocha J. On the stability of the set of hyperbolic closed orbits of a Hamiltonian. Math. Proc. Cambridge Philos. Soc.. 2010;149:373-383.Edit

[2015-38] Bessa M, Ferreira C, Rocha J, Varandas P. Generic Hamiltonian dynamics, .Edit

Bessa M, Rocha J. Contributions to the geometric and ergodic theory of conservative flows. Ergodic Theory Dynam. Systems. 2013;33:1709-1731.

Bessa M, Rocha J, Torres MJ. Shades of hyperbolicity for Hamiltonians. Nonlinearity. 2013;26:2851-2873.Edit

[2010-27] Bessa M. Chaotic C¹-generic conservative 3-flows .

[2006-40] Bessa M. On the spectrum of generic random product of compact operators .

[2006-15] Bessa M, Rocha J. The dynamics of a conservative Hénon map .Edit

[2007-17] Bessa M, Rocha J. On C1-robust transitivity of volume-preserving flows .Edit

Bessa M, Rocha J. Topological stability for conservative systems. J. Differential Equations. 2011;250:3960-3966.