Papers

Exportar 399 resultados:
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
D. Ricardo da Costa, de Paiva, L. Silva, Rocha, J. G. S., Hermes, J. D. V., Hansen, M., Viana, R. Luiz, Caldas, I. Luiz, and Medrano-T, R. O., A recursive method to find the extreme and superstable curves in the parameter space of dissipative one-dimensional mappings, Chaos: An Interdisciplinary Journal of Nonlinear Science, vol. 35, no. 2, 2025. (4.11 MB)
D. Ricardo da Costa, Caldas, I. L., and Leonel, E. D., Dynamical properties for an ensemble of classical particles moving in a driven potential well with different time perturbation, Physics Letters A, vol. 377, no. 31-33, pp. 1814 - 1821, 2013. (5.02 MB)
D. Ricardo da Costa, Hansen, M., Guarise, G., Medrano-T, R. O., and Leonel, E. D., The role of extreme orbits in the global organization of periodic regions in parameter space for one dimensional maps, Physics Letters A, vol. 380, no. 18-19, pp. 1610 - 1614, 2016.
D. Ricardo da Costa, Caldas, I. L., Ladeira, D. G., and Leonel, E. D., On the Localization of Invariant Tori in a Family of Generalized Standard Mappings and its Applications to Scaling in a Chaotic Sea, Journal of Applied Nonlinear Dynamics, vol. 7, no. 2, 2018. (370.89 KB)
D. Ricardo da Costa, Hansen, M., and Batista, A. Marcos, Parametric perturbation in a model that describes the neuronal membrane potential, Physica A: Statistical Mechanics and its Applications, vol. 515, pp. 519 - 525, 2019. (1.19 MB)
D. Ricardo da Costa, Palmero, M. S., éndez-Bermúdez, J. A., Iarosz, K. C., Jr, éD. Szezech, and Batista, A. Marcos, Tilted-hat mushroom billiards: Web-like hierarchical mixed phase space, Communications in Nonlinear Science and Numerical Simulation, vol. 91, p. 105440, 2020. (3.98 MB)
D. Ricardo da Costa, Caldas, I. L., and Leonel, E. D., Phase space properties and chaotic transport for a particle moving in a time dependent step potential well, Applied Mathematics and Computation, vol. 236, pp. 215 - 228, 2014. (3.43 MB)
J. D. da Fonseca, del-Castillo-Negrete, D., and Caldas, I. L., Area-preserving maps models of gyroaveraged E×B chaotic transport, Physics of Plasmas, vol. 21, no. 9, p. 092310, 2014. (9.71 MB)
J. D. da Fonseca, del-Castillo-Negrete, D., Sokolov, I. M., and Caldas, I. L., A statistical study of gyro-averaging effects in a reduced model of drift-wave transport, Physics of Plasmas, vol. 23, p. 082308, 2016. (1.93 MB)
E. C. da Silva, Caldas, I. L., and Viana, R. L., Field line diffusion and loss in a tokamak with an ergodic magnetic limiter, Physics of Plasmas, vol. 8, no. 6, pp. 2855 - 2865, 2001. (502.88 KB)
S. T. da Silva, Gabrick, E. C., de Moraes, A. Luiza R., Viana, R. L., Batista, A. M., Caldas, I. L., and Kurths, J., Predicting temperatures in Brazilian states capitals via Machine Learning, The European Physical Journal Special Topics, 2025. (1.75 MB)
S. T. da Silva, Gabrick, E. C., Protachevicz, P. R., Iarosz, K. C., Caldas, I. L., Batista, A. M., and Kurths, J., When climate variables improve the dengue forecasting: a machine learning approachAbstract, The European Physical Journal Special Topics, 2024. (999.54 KB)
E. C. da Silva, Roberto, M., Caldas, I. L., and Viana, R. L., Effects of the resonant modes on the magnetic footprint patterns in a tokamak wall, Physics of Plasmas, vol. 13, no. 5, p. 052511, 2006. (857.83 KB)
E. C. da Silva, Caldas, I. L., Viana, R. L., and Sanjuan, M. A. F., Escape patterns, magnetic footprints, and homoclinic tangles due to ergodic magnetic limiters, Physics of Plasmas, vol. 9, no. 12, pp. 4917 - 4928, 2002. (502.88 KB)
E. C. da Silva, Caldas, I. L., and Viana, R. L., Ergodic magnetic limiter for the TCABR, Brazilian Journal of Physics, vol. 32, no. 1, 2002. (5.84 MB)
T. M. Corrêa da Silva, Pakter, R., Rizzato, F. B., de Sousa, M. C., Caldas, I. L., and Steffens, F. M., Chaotic particle heating due to an obliquely propagating wave in a magnetized plasma, Physical Review E, vol. 88, no. 1, p. 013101, 2013. (1.25 MB)
E. C. da Silva, Caldas, I. L., and Viana, R. L., Bifurcations and onset of chaos on the ergodic magnetic limiter mapping, Chaos, Solitons & Fractals, vol. 14, no. 3, pp. 403 - 423, 2002. (1.72 MB)
S. T. da Silva, Milani, L. C., Gabrick, E. C., Iarosz, K. C., Viana, R. L., Caldas, I. L., and Batista, A. M., Rainfall forecast in Brazil using machine learning, Chaos: An Interdisciplinary Journal of Nonlinear Science, vol. 35, no. 7, 2025. (5.7 MB)
E. C. da Silva, Caldas, I. L., and Viana, R. L., The structure of chaotic magnetic field lines in a tokamak with external nonsymmetric magnetic perturbations, IEEE Transactions on Plasma Science, vol. 29, no. 4, pp. 617 - 631, 2001. (525 KB)
E. C. da Silva, Roberto, M., PORTELA, J. S. E., Caldas, I. L., and Viana, R. L., Escaping and transport barrier due to ergodic magnetic limiters in tokamaks with reversed magnetic shear, Nuclear Fusion, vol. 46, no. 4, pp. S192 - S198, 2006. (1.21 MB)
F. F. de Carvalho, Viana, R. L., and Caldas, I. L., Magnetohydrostatic Equilibrium with External Gravitational Fields in Symmetric Systems, Brazilian Journal of Physics, 2016. (3.97 MB)
R. M. de Castro, HELLER, M. V. A. P., Caldas, I. L., da Silva, R. P., and Nascimento, I. C., Electrostatic Turbulence in the TBR Tokamak, Brazilian Journal of Physics, vol. 27, no. 3, 1997. (252.8 KB)
D. R. de Lima and Caldas, I. L., Growth and performance of the periodic orbits of a nonlinear driven oscillator, Chaos, Solitons & Fractals, vol. 150, p. 111102, 2021. (5.68 MB)
M. V. de Moraes, Caldas, I. L., and Elskens, Y., Non-autonomous standard nontwist map, Chaos, Solitons & Fractals, vol. 198, p. 116492, 2025. (2.59 MB)
L. C. de Oliveira, Martins, C. G. L., Roberto, M., Caldas, I. L., and R. de Carvalho, E., Robust tori-like Lagrangian coherent structures, Physica A: Statistical Mechanics and its Applications, vol. 391, no. 24, pp. 6611 - 6616, 2012. (2.05 MB)

Páginas