Stability of systems with randomly time-varying parameters
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The stability of a system which alternates between stable and unstable configurations at random times may be investigated conveniently using Kronecker products. The system is stable with probability one if, and only if, all the eigenvalues of a specified matrix lie within the unit circle. If stability in the presence of a parameter adjustment is to be investigated, a root-locus plot of the eigenvalues is convenient.
[1] Richard Bellman,et al. Kronecker products and the second method of Lyapunov , 1959 .
[2] J. Bertram,et al. Stability of circuits with randomly time-varying parameters , 1959 .
[3] J. Clifton Samuels,et al. On the mean square stability of random linear systems , 1959, IRE Trans. Inf. Theory.
[4] R. Bellman. Limit theorems for non-commutative operations. I. , 1954 .