Publications
Extremes and recurrence in dynamical systems John Wiley & Sons, Inc., Hoboken, NJ 2016.Edit
Extremely Abundant Numbers and the Riemann Hypothesis. Journal of Integer Sequences. 2014;17(2):Article 14.2.8.Edit
Extreme values for Benedicks-Carleson quadratic maps. Ergodic Theory Dynam. Systems. 2008;28:1117-1133.
Extreme value theory for piecewise contracting maps with randomly applied stochastic perturbations. Stoch. Dyn.. 2016;16:1660015, 23.Edit
[2015-5] Extreme Value Theory for Piecewise Contracting Maps with Randomly Applied Stochastic Perturbations .Edit
Extreme value statistics for dynamical systems with noise. Nonlinearity. 2013;26:2597-2622.Edit
Extreme value laws in dynamical systems for non-smooth observations. J. Stat. Phys.. 2011;142:108-126.
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
[2015-24] Extreme Value Laws for non stationary processes generated by sequential and random dynamical systems .Edit
Extreme value laws for dynamical systems with countable extremal sets. J. Stat. Phys.. 2017;167:1244-1261.Edit
The extremal index, hitting time statistics and periodicity. Adv. Math.. 2012;231:2626-2665.
Extremal dichotomy for uniformly hyperbolic systems. Dyn. Syst.. 2015;30:383-403.Edit
Extremal behaviour of chaotic dynamics. Dyn. Syst.. 2013;28:302-332.
[2012-36] Extremal Behaviour of Chaotic Dynamics .
Extracellular Electrophysiological Measurements of Cooperative Signals in Astrocytes Populations. Frontiers in Neural Circuits. 2017;11.Edit
Extensions and submonoids of automatic monoids. Theoret. Comput. Sci.. 2002;289:727-754.Edit
An extension of the absolute reaction rate theory as applied to physiological rate processes. Ciência e Cultura. 1997;49(3):177-189.Edit
Exponential decay of hyperbolic times for Benedicks-Carleson quadratic maps. Port. Math.. 2010;67:525-540.
Explosion of smoothness for conjugacies between unimodal maps. In: Dynamics, games and science. II. Vol 2. Springer, Heidelberg; 2011. 1. p. 115-119p. (Springer Proc. Math.; vol 2).Edit