Publications
Patterns on numerical semigroups. Linear Algebra Appl.. 2006;414:652-669.Edit
Nonhomogeneous patterns on numerical semigroups. Internat. J. Algebra Comput.. 2013;23:1469-1483.Edit
ranking learning algorithms: using ibl and meta-learning on accuracy and time results. machine learning. 2003;50:251-277.Edit
Alphabetical satisfiability problem for trace equations. Acta Cybernetica. 2009;19(2):479-497.Edit
[2016-14] Tail prepivoting for the hill estimator .
Bias-corrected geometric-type estimators of the tail index. J. Phys. A. 2016;49:214003, 30.
Modelling of extremal earthquakes. Vol Mathematics of Energy and Climate Change Springer 2015.
Sur l'encadrement optimal presque sûr dans un échantillon ordonné. C. R. Acad. Sci. Paris Sér. I Math.. 1986;303:821-824.
[2005-39] Weak convergence of a bootstrap geometric-type estimator with applications to risk theory .
Weak convergence of a bootstrap geometric-type estimator with applications to risk theory. Insurance Math. Econom.. 2006;38:571-584.
Limiting behaviour of a geometric-type estimator for tail indices. Insurance Math. Econom.. 2003;33:211-226.
[2014-6] Bias corrected geometric-type estimators .
Tail prepivoting for the Hill estimator. J. Phys. A. 2016;49:194004, 12.
Consistent estimation of the tail index for dependent data. Statist. Probab. Lett.. 2010;80:1835-1843.
[2015-15] Modelling of extremal earthquakes .
Edgeworth expansion for an estimator of the adjustment coefficient. Insurance Math. Econom.. 2008;43:203-208.
[2014-36] Derivative Based Methods for Deciding SKA and SKAT DCC-FC & CMUP, Universidade do Porto .Edit
Automata for Regular Expressions with Shuffle. Information and Computation. 2017.
On the Average Size of Glushkov and Partial Derivative Automata. International Journal of Foundations of Computer Science. 2012;23:969-984.
On the average number of states of partial derivative automata. In: Developments in language theory. Vol 6224. Springer, Berlin; 2010. 1. p. 112-123p. (Lecture Notes in Comput. Sci.; vol 6224).Edit
[2014-35] Automata for KAT Expressions DCC-FC, Universidade do Porto .
On the Average Size of Glushkov and Equation Automata for KAT Expressions. In: FCT. United Kingdom, Liverpool: Springer; 2013. 7. p. 72-83p.
Partial Derivative Automaton for Regular Expressions with Shuffle. In: Shallit J, Okhotin A, editors. Proceedings of the 17th Int. Workshop on Descriptional Complexity of Formal Systems (DCFS15). Springer; 2015. 2. p. 21-32p. Edit