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A converse Lyapunov theorem for almost sure stabilizability |
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| Authors: | Annalisa Cesaroni |
| Affiliation: | aDipartimento di Matematica P. e A., Università di Padova, via Belzoni 7, 35131 Padova, Italy |
| Abstract: | We prove a converse Lyapunov theorem for almost sure stabilizability and almost sure asymptotic stabilizability of controlled diffusions: given a stochastic system a.s. stochastic open-loop stabilizable at the origin, we construct a lower semicontinuous positive definite function whose level sets form a local basis of viable neighborhoods of the equilibrium. This result provides, with the direct Lyapunov theorems proved in a companion paper, a complete Lyapunov-like characterization of the a.s. stabilizability. |
| Keywords: | Degenerate diffusion Almost sure stability Stabilizability Asymptotic stability Stochastic control Control Lyapunov function Viscosity solutions Hamilton–Jacobi–Bellman inequalities Viability |
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