Transportation-information inequalities for Markov processes

In this paper, one investigates the transportation-information T c I inequalities: α ( T c ( ν, μ )) ≤ I ( ν | μ ) for all probability measures ν on a metric space , where μ is a given probability measure, T c ( ν, μ ) is the transportation cost from ν to μ with respect to the cost function c ( x...

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Bibliographic Details
Published in:	Probability theory and related fields Vol. 144; no. 3-4; pp. 669 - 695
Main Authors:	Guillin, Arnaud, Léonard, Christian, Wu, Liming, Yao, Nian
Format:	Journal Article
Language:	English
Published:	Berlin/Heidelberg Springer-Verlag 01.07.2009 Springer Springer Nature B.V Springer Verlag
Subjects:	Continuity (mathematics) Cost function Economics Entropy Exact sciences and technology Finance Functional Analysis General topics Inequalities Inequality Inference from stochastic processes; time series analysis Insurance Management Markov analysis Markov processes Mathematical and Computational Biology Mathematical and Computational Physics Mathematics Mathematics and Statistics Metric space Operating costs Operations Research/Decision Theory Probability Probability and statistics Probability Theory and Stochastic Processes Probability theory on algebraic and topological structures Quantitative Finance Random variables Sciences and techniques of general use Statistics Statistics for Business Theoretical Transportation 60E15 60G99 60F10 26D10 60J60 60J25 47D07 Markov process Reversible processes Metric space Probability theory 60G99 . 60J25 Ergodicity Continuous function Large deviation Fisher information Sufficient condition Cost function Sobolev inequality Ergodic process 26D10 . 47D07 Probability measure Markov processes logarithmic Sobolev inequalities Transportation inequalities Poincaré inequality
ISSN:	0178-8051, 1432-2064
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Summary:	In this paper, one investigates the transportation-information T c I inequalities: α ( T c ( ν, μ )) ≤ I ( ν \| μ ) for all probability measures ν on a metric space , where μ is a given probability measure, T c ( ν, μ ) is the transportation cost from ν to μ with respect to the cost function c ( x , y ) on , I ( ν \| μ ) is the Fisher–Donsker–Varadhan information of ν with respect to μ and α : [0, ∞) → [0, ∞] is a left continuous increasing function. Using large deviation techniques, it is shown that T c I is equivalent to some concentration inequality for the occupation measure of a μ -reversible ergodic Markov process related to I (·\| μ ). The tensorization property of T c I and comparisons of T c I with Poincaré and log-Sobolev inequalities are investigated. Several easy-to-check sufficient conditions are provided for special important cases of T c I and several examples are worked out.
Bibliography:	ObjectType-Article-1 SourceType-Scholarly Journals-1 content type line 14 ObjectType-Feature-2 ObjectType-Article-2 ObjectType-Feature-1 content type line 23
ISSN:	0178-8051 1432-2064
DOI:	10.1007/s00440-008-0159-5