Stability of bimodal planar linear switched systems

Abstract: We consider bimodal planar switched linear systems and obtain dwell time bounds which guarantee their asymptotic stability. The dwell time bound obtained is a smooth function of the eigenvectors and eigenvalues of the subsystem matrices. An optimal scaling of the eigenvectors is used to strengthen the dwell time bound. A comparison of our bounds with the dwell time bounds in the existing literature is also presented.

“…A necessary and sufficient condition for stability under arbitrary switching is given in [4] for bimodal planar linear systems, and in [8] for bimodal linear systems in R 3 . In [27], we study bimodal linear switched systems, with both its subsystems stable, to find a dwell time expression as a function of eigenvalues and eigenvectors of the subsystem matrices. We obtain optimal choices of eigenvectors which result in the least dwell time.…”

Stability of Bimodal Planar Switched Linear Systems with Both Stable and Unstable Subsystems

“…A necessary and sufficient condition for stability under arbitrary switching is given in [4] for bimodal planar linear systems, and in [8] for bimodal linear systems in R 3 . In [27], we study bimodal linear switched systems, with both its subsystems stable, to find a dwell time expression as a function of eigenvalues and eigenvectors of the subsystem matrices. We obtain optimal choices of eigenvectors which result in the least dwell time.…”

Stability of Bimodal Planar Switched Linear Systems with Both Stable and Unstable Subsystems