Publications
Rankings and Preferences. New Results in Weighted Correlation and Weighted Principal Component Analysis with Applications Springer 2015.Edit
an all-at-once unimodal svm approach for ordinal classification. proceedings - 9th international conference on machine learning and applications, icmla 2010. 2010:59-64.Edit
the unimodal model for the classification of ordinal data. neural networks. 2008;21:78-91.Edit
Rejoinder to letter to the editor from C. Genest and J-F. Plante concerning `Pinto da Costa, J. & Soares, C. (2005) A weighted rank measure of correlation.' [MR2395821]. Aust. N. Z. J. Stat.. 2007;49:205-207.Edit
letter to the editor [2]. australian and new zealand journal of statistics. 2007;49:205-207.Edit
Central partition for a partition-distance and strong pattern graph. REVSTAT. 2004;2:127-143.Edit
rejoinder to letter to the editor from c. genest and j-f. plante concerning 'pinto da costa, j. & soares, c. (2005) a weighted rank measure of correlation.'. australian & new zealand journal of statistics. 2007;49:205-207.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
A weighted rank measure of correlation. Aust. N. Z. J. Stat.. 2005;47:515-529.Edit
the unimodal model for the classification of ordinal data (vol 21, pg 78, 2008). neural networks. 2014;59:73-75.Edit
Implementation of the recurrence relations of biorthogonality. Numerical Algorithms. 1992;3:173-183.Edit
QD-algorithms and recurrence relations for biorthogonal polynomials. Journal of Computational and Applied Mathematics. 1999;107:53{72.Edit
[2018-9] Actividades Científicas de Pascal Maroni .Edit
[2017-13] Program and abstracts of WOPA-Porto-2017, Workshop on Orthogonal Polynomials and Applications .Edit
Shohat-Favard and Chebyshev's methods in d-orthogonality. Numerical Algorithms. 1999;20:139-164.Edit
[2017-22] On connection coefficients, zeros and interception points of some perturbed of arbitrary order of the Chebyshev polynomials of second kind .Edit
A general method for deriving some semi-classical properties of perturbed second degree forms: the case of the Chebyshev form of second kind. J. Comput. Appl. Math.. 2016;296 :677-689.Edit
On the second order differential equation satisfied by perturbed Chebyshev polynomials. J. Math. Anal.. 2016;7(1):53-69.Edit
A simple alternative principle for rational τ-method approximation. In: Nonlinear numerical methods and rational approximation (Wilrijk, 1987). Vol 43. Reidel, Dordrecht; 1988. 4. p. 427-434p. (Math. Appl.; vol 43).Edit
Controllability of inequalities at 2-singular points. Uspekhi Mat. Nauk. 2000;55:121-122.Edit
Singularity Theory Approach to Time Averaged Optimization. Vol SINGULARITIES IN GEOMETRY AND TOPOLOGY 2007.Edit
Generic profit singularities in time averaged optimization for phase transitions in polydynamical systems. J. Math. Anal. Appl.. 2015;424:704-726.Edit
Controllability of a generic control system at a $k$-type singular point. In: International {C}onference on {D}ifferential {E}quations, {V}ol. 1, 2 ({B}erlin, 1999). World Sci. Publ., River Edge, NJ; 2000. 8. p. 841-843p. Edit