Non-normality, optimality and synchronization
Jeremie Fish, Erik M. Bollt
TL;DR
This paper investigates how non-normal matrices in directed networks affect synchronization stability, introducing Laplacian pseudospectra and Laplacian pseudospectral resilience (LPR) as new tools to better predict synchronization robustness.
Contribution
It introduces Laplacian pseudospectra and LPR as novel measures for assessing synchronization stability in non-normal directed networks.
Findings
LPR outperforms other scalar measures in predicting stability.
Optimal networks minimize LPR for better synchronization.
Non-normality significantly influences synchronization dynamics.
Abstract
It has been recognized for quite some time that for some matrices the spectra are not enough to tell the complete story of the dynamics of the system, even for linear ODEs. While it is true that the eigenvalues control the asymptotic behavior of the system, if the matrix representing the system is non-normal, short term transients may appear in the linear system. Recently it has been recognized that since the matrices representing directed networks are non-normal, analysis based on spectra alone may be misleading. Both a normal and a non-normal system may be stable according to the master stability paradigm, but the non-normal system may have an arbitrarily small attraction basin to the synchronous state whereas an equivalent normal system may have a significantly larger sync basin. This points to the need to study synchronization in non-normal networks more closely. In this work,…
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Taxonomy
TopicsNonlinear Dynamics and Pattern Formation · Neural Networks Stability and Synchronization · Gene Regulatory Network Analysis