Scattering and well-posedness for the Zakharov system at a critical space in four and more spatial dimensions

Abstract

We study the Cauchy problem for the Zakharov system in spatial dimension d 4 with initial datum (u(0), n(0), ∂t n(0)) ∈ Hk(Rd) × Hl(Rd)× Hl-1(Rd). According to Ginibre, Tsutsumi and Velo, the critical exponent of (k,l) is ((d-3)/2,(d-4)/2). We prove the scattering and the small data global well-posedness at the critical space. It seems difficult to get the crucial bilinear estimate only by applying the U2,\ V2 type spaces introduced by Koch-Tataru. To avoid the difficulty, we use an intersection space of V2 type space and the space-time Lebesgue space L2tLx2d/(d-2), which is related to the endpoint Strichartz estimate.