Publications
Found 343 results
Author [ Title] Type Year Filters: First Letter Of Last Name is B [Clear All Filters]
[2014-35] Automata for KAT Expressions DCC-FC, Universidade do Porto .
Automata for Regular Expressions with Shuffle. Information and Computation. 2017.
On the Average Complexity of Partial Derivative Automata for Semi-Extended Expressions. Journal of Automata, Languages and Combinatorics. 2017;22:5-28.Edit
On the Average Complexity of Partial Derivative Automata for Semi-Extended Expressions. Journal of Automata, Languages and Combinatorics. 2017;22:5-28.Edit
On the Average Complexity of Strong Star Normal Form. In: Pighizzini G, Câmpeanu C, editors. Description Complexity of Formal Systems (DCFS 2017). Vol 10316. Springer; 2017. 7. p. 77-88p. (LNCS; vol 10316).Edit
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
Average Size of Automata Constructions from Regular Expressions. Bulletin of the European Association for Theoretical Computer Science. 2015:167-192.Edit
On the Average Size of Glushkov and Equation Automata for KAT Expressions. In: FCT. United Kingdom, Liverpool: Springer; 2013. 7. p. 72-83p.
On the Average Size of Glushkov and Partial Derivative Automata. International Journal of Foundations of Computer Science. 2012;23:969-984.
On the Average State Complexity of Partial Derivative Automata: an analytic combinatorics approach. International Journal of Foundations of Computer Science. 2011;22:1593-1606.
The Average Transition Complexity of Glushkov and Partial Derivative Automata. In: Mauri G., Leporati A., editors. Developments in Language Theory, 15th International Conference, DLT 2011, Milano, Italy, July 2011. Proceedings. Vol 6795. Milano, Italy; 2011. 9. p. 93-104p. Edit
The average transition complexity of Glushkov and partial derivative automata. In: Developments in language theory. Vol 6795. Springer, Heidelberg; 2011. 9. p. 93-104p. (Lecture Notes in Comput. Sci.; vol 6795).Edit
[2014-6] Bias corrected geometric-type estimators .
Bias-corrected geometric-type estimators of the tail index. J. Phys. A. 2016;49:214003, 30.
BRS Analysis from Baroreflex Sequences and Baroreflex Events Compared Using Spontaneous and Drug Induced Data. In: {35th Annual Conference on Computers in Cardiology}. Vol {35}. {IEEE}; 2008. {. {p. 737-740p. }.Edit
On $C^1$-robust transitivity of volume-preserving flows. J. Differential Equations. 2008;245:3127-3143.
CENP-E and detyrosinated microtubules guide peripheral polar chromosomes towards the cell equator.. In: MOLECULAR BIOLOGY OF THE CELL. Vol 25. AMER SOC CELL BIOLOGY 8120 WOODMONT AVE, STE 750, BETHESDA, MD 20814-2755 USA; 2014. Edit
[2010-27] Chaotic C¹-generic conservative 3-flows .
Classification of Foetal Heart Rate Sequences Based on Fractal Features. Medical & Biological Engineering & Computing. 1998;36(2):249-264.Edit
Classification of ordinal data using neural networks. In: Gama J., Camacho R, Brazdil P., Jorge A, Torgo L., editors. Machine Learning: Ecml 2005, Proceedings. Vol 3720.; 2005. 6. p. 690-697p. (Lecture Notes in Artificial Intelligence; vol 3720).Edit