Trous spectraux pour certains algorithmes de Metropolis sur $\mathbb {R}$

Miclo, Laurent; Roberto, Cyril

Trous spectraux pour certains algorithmes de Metropolis sur

ℝ

Miclo, Laurent ; Roberto, Cyril

Séminaire de probabilités de Strasbourg, Tome 34 (2000), p. 336-352 / Harvested from Numdam

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Publié le : 2000-01-01

MR 1768073 | Zbl 0962.60064

@article{SPS_2000__34__336_0,
     author = {Miclo, Laurent and Roberto, Cyril},
     title = {Trous spectraux pour certains algorithmes de Metropolis sur $\mathbb {R}$},
     journal = {S\'eminaire de probabilit\'es de Strasbourg},
     volume = {34},
     year = {2000},
     pages = {336-352},
     mrnumber = {1768073},
     zbl = {0962.60064},
     language = {fr},
     url = {http://dml.mathdoc.fr/item/SPS_2000__34__336_0}
}

Miclo, Laurent; Roberto, Cyril. Trous spectraux pour certains algorithmes de Metropolis sur $\mathbb {R}$. Séminaire de probabilités de Strasbourg, Tome 34 (2000) pp. 336-352. http://gdmltest.u-ga.fr/item/SPS_2000__34__336_0/

Bibliographie

[1] D. Bakry. L'hypercontractivité et son utilisation en théorie des semigroupes. In P. Bernard, editor, Lectures on Probability Theory. Ecole d'Eté de Probabilités de Saint-Flour XXII-1992, Lecture Notes in Mathematics 1581. Springer-Verlag, 1994. | MR 1307413 | Zbl 0856.47026

[2] H.J. Brascamp and E.H. Lieb. On extensions of the Brunn-Minkowski and Prékopa-Leindler theorems, including inequalities for log concave functions, and with an application to the diffusion equation. Journal of Functional Analysis, 22:366-389, 1976. | MR 450480 | Zbl 0334.26009

[3] Cheeger J., A lower bound for smallest eigenvalue of the Laplacian, Problems in Analysis, Symposium in honor of S. Bochner, Princeton University Press, (1970), 195-199. | MR 402831 | Zbl 0212.44903

[4] Fill J.A., Eigenvalue bounds on convergence to stationarity for nonreversible Markov chains, with an application to the exclusion process, The Annals of Applied Probability, (1991) 1 (1), 62-87. | MR 1097464 | Zbl 0726.60069

[5] Lawler G. and Sokal A., Bounds on the L2 spectrum for Markov chains and Markov processes : a generalization of Cheeger inequality, Transactions of the American Mathematical Society, (1988) 309 (2), 557-580. | MR 930082 | Zbl 0716.60073

[6] S.P. Meyn and R.L. Tweedie. Markov Chains and Stochastic Stability. Springer-Verlag, 1993. | MR 1287609 | Zbl 0925.60001

[7] Miclo L., Trous spectraux à basse température: un contre-exemple à un comportement asymptotique escompté, Séminaire de Probabilités XXXII, Lecture Notes in Mathematics 1686, Springer-Verlag, (1998), 36-55. | Numdam | MR 1651228 | Zbl 0911.60089

[8] Miclo L., Une variante de l'inégalité de Cheeger pour les chaînes de Markov finies, ESAIM: P&S, URL: http://www.emath.fr/ps/, (1998) 2, 1-21. | Numdam | Zbl 0929.60051

[9] J. Neveu. Bases mathématiques du calcul des probabilités. Masson, 1970. | MR 272004 | Zbl 0203.49901

[10] Rosenthal J.S., Markov chain convergence : from finite to infinite, Stochastic Process and their applications, (1996) 62, 55-72. | MR 1388762 | Zbl 0849.60071

[11] L. Saloff-Coste. Lectures on finite Markov chains. In P. Bernard, editor, Lectures on Probability Theory and Statistics. Ecole d'Eté de Probabilités de Saint-Flour XXVI-1996, Lecture Notes in Mathematics 1665. Springer-Verlag, Berlin, 1997. | MR 1490046 | Zbl 0885.60061

[12] Sinclair A., Improved bounds for mixing rates of Markov chains and multicommodity flow, Combinatories, proba. comput., (1992) 1, 351-370. | MR 1211324 | Zbl 0801.90039