posted on 2023-06-09, 15:46authored byHjortur Bjoernsson, Sigurdur Hafstein, Peter GieslPeter Giesl, Enrico Scalas, Skuli Gudmundsson
The y-basin of attraction of the zero solution of a nonlinear stochastic differential equation can be determined through a pair of a local and a non-local Lyapunov function. In this paper, we construct a non-local Lyapunov function by solving a second-order PDE using meshless collocation. We provide a-posteriori error estimates which guarantee that the constructed function is indeed a non-local Lyapunov function. Combining this method with the computation of a local Lyapunov function for the linearisation around an equilibrium of the stochastic differential equation in question, a problem which is much more manageable than computing a Lyapunov function in a large area containing the equilibrium, we provide a rigorous estimate of the stochastic y-basin of attraction of the equilibrium.
Funding
Lyapunov Methods and Stochastic Stability; ICELANDIC RESEARCH FUND; 152429-051
History
Publication status
Published
File Version
Accepted version
Journal
Discrete and Continuous Dynamical Systems - Series B