A MATLAB function for the computation of partial synchronization manifolds for delay-coupled systems
Version 1
Authors: Wim Michiels, Hakki Ulas Unal and Erik Steur
Method: The software corresponds to the article "E. Steur, W. Michiels and H.U. Unal, Characterization and computation of partial synchronization manifolds for delay-coupled systems, SIAM Journal on Applied Dynamical Systems.".
Obtaining the software: Click here. Follow the instructions in the header.
The software is released under the GNU GPL v3.0 license.
For a complete description see
here.
Version 2
Description: updated version improving the algorithm for the case of invasive coupling, written by Libo Su. The improvements are described in the article "L. Su, W. Michiels, E. Steur and H. Nijmeijer, Computing partial synchronization manifolds of delay-coupled systems, Proceedings of the 9th European Nonlinear Dynamics Conference (ENOC 2017)".
Obtaining the software: Click here. Decompress the file and follow the instructions in the header.
The software is released under the GNU GPL v3.0 license.
For a complete description see
here.
Version 3
Description: updated version with the additional feature of computing system matrices corresponding to the synchronization error dynamics, as well as the adjacency matrix of a reduced network corresponding to the dynamics on the partial synchronization manifold, updated by Libo Su. The details regarding the synchronization error dynamics and dynamics on the manifolds can be found in “L.Su, W. Michiles, E. Steur and H. Nijmeijer, A method for computation and analysis of partial synchronization manifolds of delay coupled systems", submitted as an invited chapter in a volue of the book series Advances in Delays and Dynamics, Springer, 2018.
Obtaining the software:
Click here and follow the instructions in the header.
The software is released under the GNU GPL v3.0 license.
For a complete description see
here.
Back to overview of software for control of delay equations.
This page is maintained by Wim Michiels.
Last updated on April 18, 2018.