In this paper we consider a class of piecewise-deterministic Markov processes
(PDMPs) modeling the quantity of a given food contaminant in the body. On the
one hand, the amount of contaminant increases with random food intakes and, on
the other hand, decreases thanks to the release rate of the body. Our aim is to
provide quantitative speeds of convergence to equilibrium for the total
variation and Wasserstein distances via coupling methods.Comment: 20 page

Bouguet, Florian

ESAIM Probability and Statistics

English

arXiv

Part of PhD thesis, 15 pagesInternational audienceIn this paper we consider a class of piecewise-deterministic Markov processes modeling the quantity of a given food contaminant in the body. On the one hand, the amount of contaminant increases with random food intakes and, on the other hand, decreases thanks to the release rate of the body. Our aim is to provide quantitative speeds of convergence to equilibrium for the total variation and Wasserstein distances via coupling methods

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Quantitative speeds of convergence for exposure to food contaminants

In this paper, we consider a class of piecewise-deterministic Markov processes modeling the quantity of a given food contaminant in the body. On the one hand, the amount of contaminant increases with random food intakes and, on the other hand, decreases thanks to the release rate of the body. Our aim is to provide quantitative speeds of convergence to equilibrium for the total variation and Wasserstein distances via coupling methods

Quantitative speeds of convergence for exposure to food contaminants

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