William Oçafrain
Published 2020-01-21Version 1
This paper aims to provide some tools coming from functional inequalities to deal with quasi-stationarity for absorbed Markov processes. First, it is shown how a Poincar\'e inequality related to a suitable Doob transform entails exponential convergence of conditioned distributions to a quasi-stationary distribution in total variation and in $1$-Wasserstein distance. A special attention is paid to multi-dimensional diffusion processes, for which the aforementioned Poincar\'e inequality is implied by an easier-to-check Bakry-\'{E}mery condition depending on the right eigenvector for the sub-Markovian generator, which is not always known. Under additional assumptions on the potential, it is possible to bypass this lack of knowledge showing that exponential quasi-ergodicity is entailed by the classical Bakry-\'{E}mery condition.
The Poincaré inequality and quadratic transportation-variance inequalities
Quasi-stationarity for one-dimensional renormalized Brownian motion
Lyapunov conditions for logarithmic Sobolev and Super Poincaré inequality
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