The coarse Ricci curvature for Markov chains is generalized for continuous
time. We show that a positive coarse Ricci curvature implies a contraction of
the Markov process for the Wasserstein distance between probability measures.
This leads to a spectral gap estimate in the reversible case

Veysseire, Laurent

English

arXiv

The coarse Ricci curvature for Markov chains is generalized for continuous time. We show that a positive coarse Ricci curvature implies a contraction of the Markov process for the Wasserstein distance between probability measures. This leads to a spectral gap estimate in the reversible case

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Coarse Ricci curvature for continuous-time Markov processes

https://hal.archives-ouvertes.fr/hal-00665610

Coarse Ricci curvature for continuous-time Markov processes

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