de Oliveira PM, Picard J.. Efficiency of an Approximate Nonlinear Filterin for a Particular Class of Nonlinear Diffusion with Observations Corrupted by Small Noise. In: 39th IEEE Conference on Decision and Control.; 2000. 1. p. 1599-1601p. Edit

de Oliveira PM. Uma versão discreta do Teorema de Girsanov 1994.Edit

de Oliveira PM. Um Filtro Aproximado para uma Difusão Não Linear Bidimensional Medida Através de Observações Unidimensionais com Ruído Fraco 1997.Edit

de Oliveira AG, Silva DO. Note on the integer geometry of bitwise XOR. European J. Combin.. 2005;26:755-763.Edit

de Matos JC, Matos JM, Rodrigues MJ. Filtering the Tau method with Frobenius-Padé Approximants.. 2017.Edit

de Matos JC, Matos JM, Rodrigues MJ. Solving differential and integral equations with Tau method.. 2017.Edit

de Matos JC, Matos JM, Rodrigues MJ. On the Localization of Zeros and Poles of Chebyshev-Padé Approximants from Perturbed Functions. Vol Lecture Notes in Computational Science, vol 8584 Portugal, Guimarães: Springer International Publishing 2014.Edit

[2017-32] de Matos JC, Matos JM, Rodrigues MJ. Solving differential and integral equations with Tau method .Edit

de Carvalho M, Ramos A. Bivariate extreme statistics, II. REVSTAT. 2012;10:83-107.Edit

[2017-4] de Araujo A. The moduli space of generalized quivers .Edit

[2015-29] de Araujo A. Generalized Quivers, Orthogonal and Symplectic Representations, and Hitchin-Kobayashi Correspondences .Edit

Davydov A., Mena-Matos H., Moreira C.. Generic Profit Singularities in Time-Averaged Optimization for Cyclic Processes in Polydynamical Systems. Journal of Mathematical Sciences. 2014;199(5):510-534.Edit

Davydov A., E. Matos M. Optimal strategies and transitions between them in Arnold’s model. Doklady Mathematics. 2006;74(1):566-568.Edit

Davydov A., Basto-Gonçalves J. Controllability of a generic dynamic inequality near a singular point. In: Real and complex singularities ({S}ão {C}arlos, 1998). Vol 412. Chapman & Hall/CRC, Boca Raton, FL; 2000. 2. p. 223-235p. Edit

Davydov A., Basto-Gonçalves J. Local controllability of dynamic inequalities in general position. Sovrem. Mat. Prilozh.. 2004:56-78.Edit

Davydov A., Mena-Matos H., Moreira C.. Generic profit singularities in time averaged optimization for phase transitions in polydynamical systems. J. Math. Anal. Appl.. 2015;424:704-726.Edit

Davydov A., Basto-Gonçalves J. Controllability of inequalities at 2-singular points. Uspekhi Mat. Nauk. 2000;55:121-122.Edit

Davydov A., Mena-Matos H.. Singularity Theory Approach to Time Averaged Optimization. Vol SINGULARITIES IN GEOMETRY AND TOPOLOGY 2007.Edit

Davydov A., Basto-Gonçalves J. 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

Davydov A., Mena-Matos H.. Generic phase transitions and profit singularities in Arnold’s model. Sbornik Mathematics. 2007;198(1):17-37.Edit

Davydov A., Mena-Matos H.. Optimal Strategies and Transitions between Them in Arnold’s Model,. Doklady Mathematics. 2006;74(1):566-568.Edit

Davydov A., Basto-Gonçalves J. Controllability of generic inequalities near singular points. J. Dynam. Control Systems. 2001;7:77-99.Edit

da Silva MR, Rodrigues MJ. 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

da Rocha Z.. 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

[2014-18] da Rocha Z.. Software PSDF - Perturbed Second Degree Forms - TUTORIAL .Edit