A counterexample for the optimality of Kendall-Cranston coupling.
Kuwada, Kazumasa, Sturm, Karl-Theodor (2007)
Electronic Communications in Probability [electronic only]
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Kuwada, Kazumasa, Sturm, Karl-Theodor (2007)
Electronic Communications in Probability [electronic only]
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(Homogeneous) Markov bridges are (time homogeneous) Markov chains which begin at a given point and end at a given point. The price to pay for preserving the homogeneity is to work with processes with a random life-span. Bridges are studied both for themselves and for their use in describing the transformations of Markov chains: restriction on a random interval, time reversal, time change, various conditionings comprising the confinement in some part of the state space. These bridges...
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Electronic Communications in Probability [electronic only]
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Kiyosi Ito (1962)
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