Publications

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Dias A., Dionne B., Stewart I.. Heteroclinic Cycles and Wreath Product Symmetries. Dynamics and Stability of Sytems. 2000;15:353-385.Edit

Dias A., Moreira C.. Spectrum of the elimination of loops and multiple arrows in coupled cell systems. Nonlinearity. 2012;25:3139-3154.Edit

Dias AP, Pinho EM. Spatially Periodic Patterns of Synchrony in Lattice Networks. SIAM Journal on Applied Dynamical Systems. 2008;8(2):641-675.Edit

Díaz LJ, Rocha J. How do hyperbolic homoclinic classes collide at heterodimensional cycles? Discrete Contin. Dyn. Syst.. 2007;17:589-627.Edit

Díaz LJ, Esteves S, Rocha J. Skew product cycles with rich dynamics: from totally non-hyperbolic dynamics to fully prevalent hyperbolicity. Dyn. Syst.. 2016;31:1-40.Edit

Díaz LJ, Rocha J. Non-critical saddle-node cycles and robust non-hyperbolic dynamics. Dynam. Stability Systems. 1997;12:109-135.Edit

Díaz LJ, Rocha J. Large measure of hyperbolic dynamics when unfolding heteroclinic cycles. Nonlinearity. 1997;10:857-884.Edit

Díaz LJ, Rocha J. Partially hyperbolic and transitive dynamics generated by heteroclinic cycles. Ergodic Theory Dynam. Systems. 2001;21:25-76.Edit

Díaz LJ, Rocha J. Nonconnected heterodimensional cycles: bifurcation and stability. Nonlinearity. 1992;5:1315-1341.Edit

Díaz L., Rocha J.. Heterodimensional cycles, partial hyperbolicity and limit dynamics. Fund. Math.. 2002;174:127-186.Edit

Díaz L., Rocha J., Viana M. Strange attractors in saddle-node cycles: prevalence and globality. Invent. Math.. 1996;125:37-74.Edit

[2014-30] Diekert V, Martin F, Sénizergues G, Silva PV. Equations over free inverse monoids with idempotent variables .Edit

Diekert V., Martin F., Sénizergues G., Silva PV. Equations over free inverse monoids with idempotent variables. Theory Comput. Syst.. 2017;61(2):494-520.Edit

Domingos A., Vale I, Saraiva M., Rodrigues M., Costa M., Ferreira RA. Investigação em Educação Matemática: Raciocínio matemático Sociedade Portuguesa de Investigação em Educação Matemática 2013.Edit

Domingues JC, de Sá CC, Gessner S. Logaritmos em Portugal (sécs. XVII e XVIII). In: 6º Encontro Luso-Brasileiro de História da Matemática. Vol Anais/Actas do 6º Encontro Luso-Brasileiro de História da Matemática. Sociedade Brasileira de História da Matemática ed. Brasil, São João d'El-Rei: Sociedade Brasileira de História da Matemática; 2014. 2. p. 241-269p. Edit

Donner RV, Potirakis SM, Barbosa SM, Matos J., Pereira AJ, Neves LJ. Intrinsic vs. spurious long-range memory in high-frequency records of environmental radioactivity. The European Physical Journal. 2015;224:741-762.Edit

Duarte R., A. de Oliveira G. The braid and the Shi arrangements and the Pak–Stanley labelling. European Journal of Combinatorics. 2015;50:72-86.Edit

[2014-21] Duarte R, de Oliveira G. The braid and the Shi arrangement and the Pak-Stanley labelling .Edit

Duarte R, de Oliveira AG. A Famous Identity of Hajós in Terms of Sets. J. Integer Seq.. 2014;17:Article 14.9.1, 10.Edit

[2016-19] Duarte R, Guedes de Oliveira A. The number of parking functions with center of a given length .Edit

Duarte R. Between Shi and Ish. Discrete Mathematics. 2017;341 (2018):388-399.Edit

Duarte R, de Oliveira AG. Note on the convolution of binomial coefficients. J. Integer Seq.. 2013;16:Article 13.7.6, 9.Edit

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