Stochastic Extinction, An Average Lyapunov Function Approach
Abstract
We study the stability of M0, an invariant subset of a Markov process (Xt)t≥ 0 on a metric space M. By building the theory of average Lyapunov functions, we formulate general criteria based on the signs of Lyapunov exponents that guarantee extinction (Xt M0 as t ∞). Additionally, we provide applications to a stochastic SIS epidemic model on a network with regime-switching, a stochastic differential equation version of the Lorenz system, a general class of discrete-time ecological models, and stochastic Kolmogorov systems. In many examples we improve existing results by removing unnecessary assumptions or providing sharper criteria for the extinction.
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