Coupled Map Lattices: Abstract Dynamics and Models for Physical Systems
作者: Raymond Kapral
DOI: 10.1007/978-1-4615-3778-6_3
关键词:
摘要: Complicated spatio-temporal structures can arise when large numbers of simple dynamical elements are coupled. There many physically interesting systems that fall into this category. Numerous examples be found in biology where self-organization occurs at the cellular level, brain interactions among neurons responsible for its activity, heart patterned excitation leads to normal rhythms and converse fibrillation. One include equations continuum hydrodynamics reaction-diffusion category since they considered from a coupling local fluid elements. A range descriptions has been used study behavior such systems.
springer.com
sci-hub.st 参考文章(21)
Bai-Lin Hao, Directions in chaos World Scientific. ,(1987)
Joel Louis Lebowitz, Cyril Domb, Melville S. Green, Phase Transitions and Critical Phenomena ,(1972)
I. Prigogine, R. Lefever, Symmetry Breaking Instabilities in Dissipative Systems. II Journal of Chemical Physics. ,vol. 48, pp. 1695- 1700 ,(1968) , 10.1063/1.1668896
Yves Pomeau, Paul Manneville, Intermittent transition to turbulence in dissipative dynamical systems Communications in Mathematical Physics. ,vol. 74, pp. 189- 197 ,(1980) , 10.1007/BF01197757
Merk‐Na Chee, Raymond Kapral, Stuart G. Whittington, Phase resetting dynamics for a discrete reaction–diffusion model Journal of Chemical Physics. ,vol. 92, pp. 7315- 7322 ,(1990) , 10.1063/1.458216
Irene Waller, Raymond Kapral, Spatial and temporal structure in systems of coupled nonlinear oscillators Physical Review A. ,vol. 30, pp. 2047- 2055 ,(1984) , 10.1103/PHYSREVA.30.2047
James D. Keeler, J.Doyne Farmer, Robust space-time intermittency and 1/ f noise Physica D: Nonlinear Phenomena. ,vol. 23, pp. 413- 435 ,(1986) , 10.1016/0167-2789(86)90148-X
K. Kaneko, Spatiotemporal Intermittency in Coupled Map Lattices Progress of Theoretical Physics. ,vol. 74, pp. 1033- 1044 ,(1985) , 10.1143/PTP.74.1033
Gian-Luca Oppo, Raymond Kapral, Discrete models for the formation and evolution of spatial structure in dissipative systems Physical Review A. ,vol. 33, pp. 4219- 4231 ,(1986) , 10.1103/PHYSREVA.33.4219
Y. Oono, S. Puri, Computationally efficient modeling of ordering of quenched phases. Physical Review Letters. ,vol. 58, pp. 836- 839 ,(1987) , 10.1103/PHYSREVLETT.58.836