On the gap between deterministic and probabilistic Lyapunov exponents for continuous-time linear systems

Abstract

Consider a non-autonomous continuous-time linear system in which the time-dependent matrix determining the dynamics is piecewise constant and takes finitely many values A1, …c, AN. This paper studies the equality cases between the maximal Lyapunov exponent associated with the set of matrices \A1, …c, AN\, on the one hand, and the corresponding ones for piecewise deterministic Markov processes with modes A1, …c, AN, on the other hand. A fundamental step in this study consists in establishing a result of independent interest, namely, that any sequence of Markov processes associated with the matrices A1,…c, AN converges, up to extracting a subsequence, to a Markov process associated with a suitable convex combination of those matrices.

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