Stability in Quasineutral Plasmas with Thermalized Electrons

TL;DR

This paper proves the stability of the quasineutral limit in ionic Vlasov-Poisson systems with thermalized electrons under exponentially small perturbations, introducing new analytical tools to handle exponential coupling challenges.

Contribution

It introduces novel methods to analyze stability in quasineutral plasmas, addressing exponential coupling and improving moment assumptions for well-posedness.

Findings

Stability established under exponential smallness perturbations.

New techniques for handling exponential Poisson coupling.

Enhanced regularity bounds and growth estimates in Vlasov systems.

Abstract

In this paper, we establish the stability of the quasineutral limit for the ionic Vlasov-Poisson system under perturbations exponentially small in Wasserstein sense. Notably, we emphasize that exponential smallness is a necessary condition in the electron case, as the presence of instabilities makes polynomial smallness insufficient. The study's quantitative nature introduces unique challenges, primarily arising from the exponential Poisson coupling. These challenges necessitate careful optimization at every step of the proof, whether it be in refining estimates or in the overall approach. Within this paper, we introduce novel tools and approaches to address these challenges. Specifically, we enhance the existing theory concerning the growth of characteristics in Vlasov systems featuring nonlinear couplings. Additionally, we combine stability estimates using kinetic-Wasserstein distances with improved regularity bounds on the elliptic coupling. In the course of demonstrating our central result, we also enhance the moment assumptions associated with the well-posedness of the ionic Vlasov-Poisson system.