Alarcón B, Castro SB, Labouriau IS. Global saddles for planar maps. Journal of Dynamics and Differential Equations. In Press.

[2016-12] Alarcón B, Castro SB, Labouriau IS. Global Saddles for Planar Maps .

[2012-11] Labouriau IS, Rodrigues AA. Global Generic Dynamics Close to Symmetry .Edit

Labouriau IS, Rodrigues AA. Global generic dynamics close to symmetry. J. Differential Equations. 2012;253:2527-2557.Edit

[2012-12] Alarcón B, Castro SB, Labouriau IS. Global Dynamics for Symmetric Planar Maps .

Alarcón B, Castro SB, Labouriau IS. Global dynamics for symmetric planar maps. Discrete Contin. Dyn. Syst.. 2013;33:2241-2251.

[2015-10] Labouriau IS, Rodrigues AA. Global bifurcations close to symmetry .Edit

Labouriau IS, Rodrigues AA. Global bifurcations close to symmetry. Journal of Mathematical Analysis and Applications. 2016;444(1):648-671.Edit

Alves JF, Li X. Gibbs-Markov-Young structures with (stretched) exponential tail for partially hyperbolic attractors. Adv. Math.. 2015;279:405-437.Edit

Dias C.. Gibbs-Markov-Young structures. In: ESAIM. Vol 36.; 2012. 6. p. 61-67p. Edit

Alves JF, Pinheiro V. Gibbs-Markov structures and limit laws for partially hyperbolic attractors with mostly expanding central direction. Adv. Math.. 2010;223:1706-1730.Edit

Almeida J, Perrin D. Gérard Lallement (1935–2006). Semigroup Forum. 2009;78:379-383.Edit

[2004-39] Basto-Gonçalves J, Reis H.. The geometry of quadratic 2x2 systems of conservation laws .Edit

[2006-42] Labouriau IS, R.F.Pinto P. The geometry of Hopf and saddle-node bifurcations for waves of Hodgkin-Huxley type .Edit

Labouriau IS, Pinto PR. The geometry of Hopf and saddle-node bifurcations for waves of Hodgkin-Huxley type. In: Real and complex singularities. Vol 380. Cambridge Univ. Press, Cambridge; 2010. 2. p. 229-245p. (London Math. Soc. Lecture Note Ser.; vol 380).Edit

Labouriau IS, Pinto PR. The geometry of Hopf and saddle-node bifurcations for waves of Hodgkin-Huxley type. In: Real and complex singularities. Vol 380. Cambridge Univ. Press, Cambridge; 2010. 2. p. 229-245p. Edit

Alves JF, Dias CL, Luzzatto S. Geometry of expanding absolutely continuous invariant measures and the liftability problem. Ann. Inst. H. Poincaré Anal. Non Linéaire. 2013;30:101-120.Edit

Basto-Gonçalves J, Reis H. The geometry of 2×2 systems of conservation laws. Acta Applicandae Mathematicae. 2005;88(3):269-329.

Basto-Gonçalves J, Reis H.. The geometry of $2\times 2$ systems of conservation laws. Acta Appl. Math.. 2005;88:269-329.Edit

Carvalho M, Hager M. Geometric orbits. Mathematical Intelligencer. 2012;34(2):56-62.Edit

Almeida J, Costa A. A geometric interpretation of the Schützenberger group of a minimal subshift. Arkiv för Matematik. 2016;54(2):243-275.Edit

Basto-Gonçalves J. Geometric conditions for local controllability. J. Differential Equations. 1991;89:388-395.

Araújo V, Silva PV. Geometric characterizations of virtually free groups. J. Algebra Appl.. 2017;16(9):1750180.Edit

[2014-14] Araújo V, Silva PV. Geometric characterizations of virtually free groups .Edit

Silva PV, Steinberg B. A geometric characterization of automatic monoids. Q. J. Math.. 2004;55:333-356.Edit