Publications
A General Hippocampal Computational Model: Episodic and Spatial Memory Combined in a Spiking Model University of Edinburgh 2006.
A General Hippocampal Computational Model Combining Episodic and Spatial Memory in a Spiking Model.. 2006.
[2016-12] Global Saddles for Planar Maps .
[2012-12] Global Dynamics for Symmetric Planar Maps .
Global dynamics for symmetric planar maps. Discrete Contin. Dyn. Syst.. 2013;33:2241-2251.
Global saddles for planar maps. Journal of Dynamics and Differential Equations. In Press.
Gérard Lallement (1935–2006). Semigroup Forum. 2009;78:379-383.Edit
A geometric interpretation of the Schützenberger group of a minimal subshift. Arkiv för Matematik. 2016;54(2):243-275.Edit
The gap between partial and full. Internat. J. Algebra Comput.. 1998;8:399-430.Edit
[2004-18] The globals of pseudovarieties of ordered semigroups containing $B_2$ and an application to a proble .Edit
Globals of pseudovarieties of commutative semigroups: the finite basis problem, decidability and gaps. Proc. Edinb. Math. Soc. (2). 2001;44:27-47.Edit
The globals of some subpseudovarieties of DA. Internat. J. Algebra Comput.. 2004;14:525-549.Edit
The globals of pseudovarieties of ordered semigroups containing $B_2$ and an application to a problem proposed by Pin. Theor. Inform. Appl.. 2005;39:1-29.Edit
Generalized varieties of commutative and nilpotent semigroups. Semigroup Forum. 1984;30:77-98.Edit
Geometry of expanding absolutely continuous invariant measures and the liftability problem. Ann. Inst. H. Poincaré Anal. Non Linéaire. 2013;30:101-120.Edit
Gibbs-Markov structures and limit laws for partially hyperbolic attractors with mostly expanding central direction. Adv. Math.. 2010;223:1706-1730.Edit
Gibbs-Markov-Young structures with (stretched) exponential tail for partially hyperbolic attractors. Adv. Math.. 2015;279:405-437.Edit
Geometric characterizations of virtually free groups. J. Algebra Appl.. 2017;16(9):1750180.Edit
[2010-29] Groups defined by automata .Edit
Geometric conditions for local controllability. J. Differential Equations. 1991;89:388-395.
The geometry of $2\times 2$ systems of conservation laws. Acta Appl. Math.. 2005;88:269-329.Edit
The geometry of 2×2 systems of conservation laws. Acta Applicandae Mathematicae. 2005;88(3):269-329.