Global Hilbert Expansion for the Vlasov-Poisson-Boltzmann System

Abstract

We study the Hilbert expansion for small Knudsen number for the Vlasov-Boltzmann-Poisson system for an electron gas. The zeroth order term takes the form of local Maxwellian: F0(t,x,v)=0(t,x)(2π θ0(t,x))3/2 e-|v-u0(t,x)|2/2θ0(t,x),\ θ0(t,x)=K02/3(t,x). Our main result states that if the Hilbert expansion is valid at t=0 for well-prepared small initial data with irrotational velocity u0, then it is valid for 0≤ t≤ -1/22k-32k-2, where 0(t,x) and u0(t,x) satisfy the Euler-Poisson system for monatomic gas γ=5/3.