PROPAGATION OF MOMENTS AND REGULARITY FOR THE VLASOV-MAXWELL-BOPP-PODOLSKY MODEL - Institut de Recherche Mathématique de Rennes Access content directly
Preprints, Working Papers, ... Year : 2024

PROPAGATION OF MOMENTS AND REGULARITY FOR THE VLASOV-MAXWELL-BOPP-PODOLSKY MODEL

Christophe Cheverry
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  • PersonId : 828791
Institut de Recherche Mathématique de Rennes
Slim Ibrahim
  • Function : Author
University of Victoria [Canada]

Abstract

We consider a class of hyperbolic systems which can be interpreted as approximations of the relativistic Vlasov-Maxwell system. These equations are derived by taking into account radiation-reaction effects occurring at a microscopic level. They involve a small length "l", called the Bopp-Podolsky parameter. In this context, we address common issues in kinetic equations such as the propagation of moments, regularity properties and well-posedness. We also investigate semiclassical limits appearing when "l" goes to zero.

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Mathematics [math]
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https://hal.science/hal-04570157

Submitted on : Monday, May 6, 2024-8:09:23 PM

Last modification on : Thursday, May 9, 2024-3:11:29 AM

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hal-04570157 , version 1 (06-05-2024)

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  • HAL Id : hal-04570157 , version 1

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Christophe Cheverry, Slim Ibrahim. PROPAGATION OF MOMENTS AND REGULARITY FOR THE VLASOV-MAXWELL-BOPP-PODOLSKY MODEL. 2024. ⟨hal-04570157⟩

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