Differentiable Generalized Synchronization of Chaotic Systems

Brian R. Hunt, Edward Ott, and James A. Yorke

Phys. Rev. E 55 (1997), 4029-4034.

Online abstract and download information

We consider simple Lyapunov-exponent-based conditions under which the response of a system to a chaotic drive is a smooth function of the drive state. We call this differentiable generalized synchronization (DGS). When DGS does not hold, we quantify the degree of nondifferentiability using the Holder exponent. We also discuss the consequences of DGS and give an illustrative numerical example.

Back to my list of recent papers.

Back to my home page.

Last updated: June 23, 1998