Publications

Found 116 results
Author [ Title(Desc)] Type Year
Filters: First Letter Of Title is D  [Clear All Filters]
A B C D E F G H I J K L M N O P Q R S T U V W X Y Z 
D
Chapman S., García-Sánchez PA, Llena D., Malyshev A., Steinberg D.. On the delta set and the Betti elements of a BF-monoid. Arab. J. Math. (Springer). 2012;1:53-61.Edit
García-Sánchez PA, Llena D, Moscariello A. Delta sets for nonsymmetric numerical semigroups with embedding dimension three. Forum Math.. 2018;30:15-30.Edit
García-Sánchez PA, Llena D., Moscariello A.. Delta sets for symmetric numerical semigroups with embedding dimension three. Aequationes Math.. 2017;91:579-600.Edit
Labouriau IS, Rodrigues A.. Dense heteroclinic tangencies near a Bykov cycle. Journal of Differential Equations. 2015; 259(11):5875-5902.
Pastijn F., Oliveira LA. Dense ideal extensions of strict regular semigroups. Algebra Discrete Math.. 2006:67-80 (2007).Edit
[2007-5] Bessa M, Rocha J. Denseness of ergodicity for a class of partially hyperbolic volume-preserving flows .Edit
Bessa M, Rocha J. Denseness of ergodicity for a class of volume-preserving flows. Port. Math.. 2011;68:1-17.
[2009-15] Pinto P., Baptista M., Labouriau IS. Density of first Poincaré returns, periodic orbits and Kolmogorov-Sinai entropy .Edit
Pinto PR, Baptista M., Labouriau IS. Density of first Poincaré returns, periodic orbits, and Kolmogorov-Sinai entropy. Commun. Nonlinear Sci. Numer. Simul.. 2011;16:863-875.Edit
Aguiló-Gost F, Sánchez PA, Llena D.. Denumerants of 3-numerical semigroups. In: Conference on Discrete Mathematics and Computer Science (Spanish). Vol 46. Elsevier Sci. B. V., Amsterdam; 2014. 3. p. 3-10p. (Electron. Notes Discrete Math.; vol 46).Edit
[2009-25] Chertovskih R, Gama SM, Podvigina O., Zheligovsky V.. Dependence of magnetic field generation by thermal convection on the rotation rate .Edit
Chertovskih R, Gama SM, Podvigina O., Zheligovsky V.. Dependence of magnetic field generation by thermal convection on the rotation rate: a case study. Physica D: Nonlinear Phenomena. 2010;239(13):1188-1209.Edit
Monteiro JP, Oliveira HP, Aguiar P, Cardoso JS. A depth-map approach for automatic mice behavior recognition. In: Image Processing (ICIP), 2014 IEEE International Conference on. IEEE; 2014. 2. p. 2261-2265p. Edit
Monteiro JP, Oliveira HP, Aguiar P, Cardoso JS. Depth-map images for automatic mice behavior recognition. In: 1st PhD Students Conference in Electrical and Computer Engineering, Porto, Portugal.; 2012. Edit
[2014-40] Benkart G, Lopes SA, Ondrus M. Derivations of a parametric family of subalgebras of the Weyl algebra .Edit
Benkart G, Lopes SA, Ondrus M. Derivations of a parametric family of subalgebras of the Weyl algebra. J. Algebra. 2015;424:46-97.Edit
[2014-36] Broda S, Cavadas S, Moreira N. Derivative Based Methods for Deciding SKA and SKAT DCC-FC & CMUP, Universidade do Porto .Edit
[2013-23] Nabais D, Moreira N, Reis R. Desco: a knowledge based system for descriptional complexity of formal languages .Edit
[2011-36] Moreira N, Nabais D, Reis R. DesCo: a Web Based Information System for Descriptional Complexity Results .Edit
Almeida J, Zeitoun M. Description and analysis of a bottom-up DFA minimization algorithm. Inform. Process. Lett.. 2008;107:52-59.Edit
Jespers E., Shahzamanian M.. A description of a class of finite semigroups that are near to being Mal\cprime cev nilpotent. J. Algebra Appl.. 2013;12:1250221, 26.Edit
Descriptional Complexity of Formal Systems, 14th International Workshop (DCFS 2012). Vol 7386. Kutrib M, Moreira N, Reis R, editors Springer 2012.Edit
Descriptional Complexity of Formal Systems, 15th International Workshop (DCFS 2013). Vol 8031. Jurgensen H, Reis R, editors Springer 2013.Edit
Aguiar P, Szücs P. Detailed visualization and morphometric analysis of reconstructed neurons using Blender and Python. BMC Neuroscience. 2011;12:P323.Edit
Pacheco MR. Determinação do Centralizador de um dado Automorfismo do Toro Bidimensional 2006.Edit

Pages

Error | CMUP

Error

The website encountered an unexpected error. Please try again later.