Landau damping in finite regularity for unconfined systems with screened interactions

Abstract

We prove Landau damping for the collisionless Vlasov equation with a class of L1 interaction potentials (including the physical case of screened Coulomb interactions) on R3x × R3v for localized disturbances of an infinite, homogeneous background. Unlike the confined case T3x × Rv3, results are obtained for initial data in Sobolev spaces (as well as Gevrey and analytic classes). For spatial frequencies bounded away from zero, the Landau damping of the density is similar to the confined case. The finite regularity is possible due to an additional dispersive mechanism available on Rx3 which reduces the strength of the plasma echo resonance.