Efficient Method for Computing with Certainty Periodic Orbits on a Surface of Section
暂无分享,去创建一个
Michael N. Vrahatis | M. N. Vrahatis | E. A. Perdios | V. S. Kalantonis | V. Kalantonis | E. Perdios
[1] Michael N. Vrahatis,et al. An efficient method for locating and computing periodic orbits of nonlinear mappings , 1995 .
[2] Al Young. Providence, Rhode Island , 1975 .
[3] Michael N. Vrahatis,et al. Computing with certainty individual members of families of periodic orbits of a given period , 2001 .
[4] Michael N. Vrahatis,et al. Application of the Characteristic Bisection Method for locating and computing periodic orbits in molecular systems , 2001 .
[5] V. V. Markellos. On the stability parameters of periodic solutions , 1976 .
[6] K. Sikorski. Bisection is optimal , 1982 .
[7] Drossos,et al. Method for computing long periodic orbits of dynamical systems. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.
[8] J. Cronin. Fixed points and topological degree in nonlinear analysis , 1995 .
[9] J. Wiersig,et al. Elliptic Quantum Billiard , 1996, chao-dyn/9612020.
[10] N. Buric,et al. MODULAR SMOOTHING OF ACTION , 1998 .
[11] Michael N. Vrahatis,et al. Solving systems of nonlinear equations using the nonzero value of the topological degree , 1988, TOMS.