Computation of Lyapunov functions for systems with multiple local attractors

Björnsson, Jóhann; Giesl, Peter; Hafstein, Sigurdur F.; Kellett, Christopher M.

Title: Computation of Lyapunov functions for systems with multiple local attractors
Creator: Björnsson, Jóhann; Giesl, Peter; Hafstein, Sigurdur F.; Kellett, Christopher M.
Relation: Discrete and Continuous Dynamical Systems: Series A Vol. 35, Issue 9, p. 4019-4039
Publisher Link: http://dx.doi.org/10.3934/dcds.2015.35.4019
Publisher: American Institute of Mathematical Sciences (AIMS)
Resource Type: journal article
Date: 2015
Description: We present a novel method to compute Lyapunov functions for continuous-time systems with multiple local attractors. In the proposed method one first computes an outer approximation of the local attractors using a graphtheoretic approach. Then a candidate Lyapunov function is computed using a Massera-like construction adapted to multiple local attractors. In the final step this candidate Lyapunov function is interpolated over the simplices of a simplicial complex and, by checking certain inequalities at the vertices of the complex, we can identify the region in which the Lyapunov function is decreasing along system trajectories. The resulting Lyapunov function gives information on the qualitative behavior of the dynamics, including lower bounds on the basins of attraction of the individual local attractors. We develop the theory in detail and present numerical examples demonstrating the applicability of our method.
Subject: Lyapunov methods; Lyapunov functions; continuous-time systems
Identifier: http://hdl.handle.net/1959.13/1338601
Identifier: uon:28061
Identifier: ISSN:1078-0947
Language: eng
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