Couplings and quantitative con- traction rates for Langevin dynamics.The Annals of Probability, 47(4):1982 – 2010

Andreas Eberle, Arnaud Guillin, Raphael Zimmer · 1982

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Long-time $L^p$ Wasserstein contraction for diffusion processes without global dissipativity

math.PR · 2026-02-28 · unverdicted · novelty 7.0

Conditions for long-time L^p Wasserstein contraction are derived for non-globally dissipative diffusions, extending to non-elliptic processes with a one-dimensional characterization via the maximal eigenvalue of a Feynman-Kac operator.

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Long-time $L^p$ Wasserstein contraction for diffusion processes without global dissipativity math.PR · 2026-02-28 · unverdicted · none · ref 16
Conditions for long-time L^p Wasserstein contraction are derived for non-globally dissipative diffusions, extending to non-elliptic processes with a one-dimensional characterization via the maximal eigenvalue of a Feynman-Kac operator.

Couplings and quantitative con- traction rates for Langevin dynamics.The Annals of Probability, 47(4):1982 – 2010

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