Nonlinear instability of Vlasov-Maxwell systems in the classical and quasineutral limits

Abstract

We study the instability of solutions to the relativistic Vlasov-Maxwell systems in two limiting regimes: the classical limit when the speed of light tends to infinity and the quasineutral limit when the Debye length tends to zero. First, in the classical limit 0, with being the inverse of the speed of light, we construct a family of solutions that converge initially polynomially fast to a homogeneous solution μ of Vlasov-Poisson in arbitrarily high Sobolev norms, but become of order one away from μ in arbitrary negative Sobolev norms within time of order | |. Second, we deduce the invalidity of the quasineutral limit in L2 in arbitrarily short time.