Publications
Exponential decay of hyperbolic times for Benedicks-Carleson quadratic maps. Port. Math.. 2010;67:525-540.
Heart rate variability in brain death. {CLINICAL AUTONOMIC RESEARCH}. 1996;{6}:{141-146}.Edit
Speed of convergence for laws of rare events and escape rates. Stochastic Process. Appl.. 2015;125:1653-1687.
Statistical stability for equilibrium states. Vol Dynamics, games and science. {II}. Peixoto M., Pinto A., Rand D., editors Portugal, Braga: Springer Proc. Math. 2011.Edit
Rare events for the Manneville–Pomeau map. Stochastic Process. Appl.. 2016;126:3463-3479.Edit
Extreme values for Benedicks-Carleson quadratic maps. Ergodic Theory Dynam. Systems. 2008;28:1117-1133.
The statistical stability of equilibrium states for interval maps. Nonlinearity. 2009;22:259-281.
Continuity of SRB measure and entropy for Benedicks-Carleson quadratic maps. Nonlinearity. 2005;18:831-854.
Statistics of the maximum for the tent map. Chaos Solitons Fractals. 2009;42:604-608.
Hitting time statistics and extreme value theory. Probab. Theory Related Fields. 2010;147:675-710.
Convergence of Marked Point Processes of Excesses for Dynamical Systems. Journal of the European Mathematical Society. In Press.
On the link between dependence and independence in extreme value theory for dynamical systems. Statist. Probab. Lett.. 2008;78:1088-1093.
Extreme value laws for non stationary processes generated by sequential and random dynamical systems. Ann. Inst. Henri Poincaré Probab. Stat.. 2017;53:1341-1370.Edit
[2007-26] Notes on the link between dependence and independence in extreme value theory for dynamical systems .
Extreme value laws in dynamical systems for non-smooth observations. J. Stat. Phys.. 2011;142:108-126.
Asymptotic distribution of the maximum for a chaotic economic model. J. da Silva L, Caeiro F., Natário I., Braumann C.A, editors Springer 2013.Edit
[2015-24] Extreme Value Laws for non stationary processes generated by sequential and random dynamical systems .Edit
[2012-36] Extremal Behaviour of Chaotic Dynamics .
Extremal behaviour of chaotic dynamics. Dyn. Syst.. 2013;28:302-332.
The compound Poisson limit ruling periodic extreme behaviour of non-uniformly hyperbolic dynamics. Comm. Math. Phys.. 2013;321:483-527.