Skip to main content
Article thumbnail
Location of Repository

Solution of the boundary value problem for optimal escape in continuous stochastic systems and maps.

By S. Beri, R. Mannella, Dmitry G. Luchinsky, A. N. Silchenko and Peter V. E. McClintock

Abstract

Topologies of invariant manifolds and optimal trajectories are investigated in stochastic continuous systems and maps. A topological method is introduced that simplifies the solution of boundary value problems: The activation energy is calculated as a function of a set of parameters characterizing the initial conditions of the escape path. The method is applied explicitly to compute the optimal escape path and the activation energy for a variety of dynamical systems and maps

Year: 2005
OAI identifier: oai:eprints.lancs.ac.uk:9329
Provided by: Lancaster E-Prints

Suggested articles


To submit an update or takedown request for this paper, please submit an Update/Correction/Removal Request.