A Note on Subexponential Rate of Convergence to Equilibrium for Processes on the Half-Line

Published 24 Mar 2020 in math.PR | (2003.10614v2)

Abstract: A powerful tool for studying long-term convergence of a Markov process to its stationary distribution is a Lyapunov function. In some sense, this is a substitute for eigenfunctions. For a stochastically ordered Markov process on the half-line, Lyapunov functions can be used to easily find explicit rates of convergence. Our earlier research focused on exponential rate of convergence. This note extends these results to slower rates, including power rates, thus improving results of (Douc, Fort, Guillin, 2009).

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Andrey Sarantsev

A Note on Subexponential Rate of Convergence to Equilibrium for Processes on the Half-Line

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