JOURNAL ARTICLE
Stabilization of switched linear systems with multiple time-delays
Abstract
This paper considers the problem of stabilization of switched linear systems with multiple time-delays. If the convex combination Sigmaalpha j Atilde j is Hurwitz and the upper bound of delays has a limitation, the system is stabilized under a switching rule and the switching rule has been designed. The single-Lyapunov function is used to analyze the stabilization of the system with a sufficiently small upper bound of delays via a switching rule.
Keywords:
Upper and lower bounds Function (biology) Lyapunov function Regular polygon Computer science Linear system Mathematics Control theory (sociology) Combinatorics Discrete mathematics Artificial intelligence Control (management) Physics Mathematical analysis
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Topics
Stability and Control of Uncertain Systems
Physical Sciences → Engineering → Control and Systems Engineering
Neural Networks Stability and Synchronization
Physical Sciences → Computer Science → Computer Networks and Communications
Stability and Controllability of Differential Equations
Physical Sciences → Engineering → Control and Systems Engineering
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