摘要The Lorenz mapping is a discretization of a pair of differential equations. It illustrates the pertinence of computational chaos. We describe complex dynamics, bifurcations, and chaos in the map. Fractal basins are displayed by numerical simulation.
Abstract:The Lorenz mapping is a discretization of a pair of differential equations. It illustrates the pertinence of computational chaos. We describe complex dynamics, bifurcations, and chaos in the map. Fractal basins are displayed by numerical simulation.
I. Djellit**;J. C. Sprott;M. R. Ferchichi
. Fractal Basins in the Lorenz Model[J]. 中国物理快报, 2011, 28(6): 60501-060501.
I. Djellit**, J. C. Sprott, M. R. Ferchichi
. Fractal Basins in the Lorenz Model. Chin. Phys. Lett., 2011, 28(6): 60501-060501.
[1] Lorenz E N 1989 Physica D 35 299
[2] Whitehead R R and MacDonald N 1984 Physica D 31 401
[3] Tsybullin V and Yudovich V 1998 Int. J. Difference Equat. Appl. 4 397
[4] ELabbasy E M, Agiza H N, EL-Metwally H and Elsadany A A 2007 Int. J. Nonlin. Sci. 4 171
[5] Mira C, Gardini L, Barugola A and Cathala J C 1996 Chaotic Dynamics in Two-Dimensional Noninvertible Maps (Singapore: World Scientific)
[6] Marotto F R 1978 J. Math. Anal. Appl. 63 199
[7] Froyland J 1983 Physica D 8 423
[8] Frouzakis C E, Kevrekidis I G and Peckham B B 2003 Physica D 177 101
2011, Vol. 28 
