论文信息 - On contraction properties of Markov kernels

On contraction properties of Markov kernels

Abstract. We study Lipschitz contraction properties of general Markov kernels seen as operators on spaces of probability measures equipped with entropy-like ``distances''. Universal quantitative bounds on the associated ergodic constants are deduced from Dobrushin's ergodic coefficient. Strong contraction properties in Orlicz spaces for relative densities are proved under more restrictive mixing assumptions. We also describe contraction bounds in the entropy sense around arbitrary probability measures by introducing a suitable Dirichlet form and the corresponding modified logarithmic Sobolev constants. The interest in these bounds is illustrated on the example of inhomogeneous Gaussian chains. In particular, the existence of an invariant measure is not required in general.

P. Moral | M. Ledoux | P. Del Moral | L. Miclo

[1] R. Dobrushin. Central Limit Theorem for Nonstationary Markov Chains. II , 1956 .

[2] F. Smithies,et al. Convex Functions and Orlicz Spaces , 1962, The Mathematical Gazette.

[3] J. A. Fill. Eigenvalue bounds on convergence to stationarity for nonreversible markov chains , 1991 .

[4] Joel E. Cohen,et al. Relative entropy under mappings by stochastic matrices , 1993 .

[5] P. Diaconis,et al. LOGARITHMIC SOBOLEV INEQUALITIES FOR FINITE MARKOV CHAINS , 1996 .

[6] L. Miclo,et al. Remarques sur l’hypercontractivité et l’évolution de l’entropie pour des chaînes de Markov finies , 1997 .

[7] L. Saloff-Coste,et al. Lectures on finite Markov chains , 1997 .

[8] Dobrushin Coefficients of Ergodicity and Asymptotically Stable L1-Contractions , 1999 .

[9] Liming Wu,et al. A new modified logarithmic Sobolev inequality for Poisson point processes and several applications , 2000 .

[10] P. Moral,et al. Branching and interacting particle systems. Approximations of Feynman-Kac formulae with applications to non-linear filtering , 2000 .

[11] L. Miclo. Notes on the Speed of Entropic Convergence in the Central Limit Theorem , 2003 .

[12] Pierre Del Moral,et al. Feynman-Kac formulae , 2004 .