Small data scattering for a cubic Dirac equation with Hartree type nonlinearity in 1+3

Abstract

We prove that the initial value problem for the Dirac equation ( -iγμ ∂μ + m ) = (e- |x||x| ( )) in \ 1+3 is globally well-posed and the solution scatters to free waves asymptotically as t → ∞, if we start with initial data that is small in Hs for s>0. This is an almost critical well-posedness result in the sense that L2 is the critical space for the equation. The main ingredients in the proof are Strichartz estimates, space-time bilinear null-form estimates for free waves in L2, and an application of the Up and Vp-function spaces.