Solitary Wave Solutions for the Nonlinear Dirac Equations

Abstract

In this paper we prove the existence and local uniqueness of stationary states for the nonlinear Dirac equation \[ i Σj=03 j j - m + F() =0 \] where m >0 and F(s) = |s|θ for 1≤ θ < 2. More precisely we show that there exists 0 > 0 such that for ω ∈(m - 0, m), there exists a solution (t,x) = e-iω tφω(x), x0 = t, x = (x1, x2, x3), and the mapping from ω to φω is continuous. We prove this result by relating the stationary solutions to the ground states of nonlinear Schr\"odinger equations.