共 8 条
- [1] A fast method for distinguishing between ordered and chaotic orbitsASTRONOMY & ASTROPHYSICS, 1997, 317 (01) : 73 - 81Contopoulos, GVoglis, N
- [2] Method for distinguishing between ordered and chaotic orbits in four-dimensional mapsPHYSICAL REVIEW E, 1998, 57 (01): : 372 - 377Voglis, NContopoulos, GEfthymiopoulos, C
- [3] Method for distinguishing between ordered and chaotic orbits in four-dimensional maps Phys Rev E., 1 (372):
- [4] Smaller alignment index (Sali): Determining the ordered or chaotic nature of orbits in conservative dynamical systemsPROCEEDINGS OF THE CONFERENCE ON LIBRATION POINT ORBITS AND APPLICATIONS, 2003, : 653 - 664Skokos, CAntonopollos, CBountis, TCVrahatis, MN
- [5] Making a dynamical system chaotic: Feedback control of 15 Lyapunov exponents for discrete-time dynamical systemsIEEE TRANSACTIONS ON CIRCUITS AND SYSTEMS I-FUNDAMENTAL THEORY AND APPLICATIONS, 1997, 44 (03): : 250 - 253Chen, GRLai, DJ
- [6] A non-trivial relation between some many-dimensional chaotic discrete dynamical systems and some one-dimensional chaotic discrete dynamical systemsCOMPUTER PHYSICS COMMUNICATIONS, 2008, 179 (09) : 628 - 633Mazrooei-Sebdani, RezaDehghan, Mehdi
- [7] Numerical analysis of dynamical systems: unstable periodic orbits, hidden transient chaotic sets, hidden attractors, and finite-time Lyapunov dimensionVII INTERNATIONAL CONFERENCE PROBLEMS OF MATHEMATICAL PHYSICS AND MATHEMATICAL MODELLING, 2019, 1205Kuznetsov, N. V.Mokaev, T. N.
- [8] Stabilization of periodic orbits of discrete-time dynamical systems using the Prediction-Based Control: New control law and practical aspectsJOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 2018, 355 (12): : 4771 - 4793Chagas, T. P.Bliman, P. -A.Kienitz, K. H.