On Traveling Solitary Waves and Absence of Small Data Scattering for Nonlinear Half-Wave Equations

Abstract

We consider nonlinear half-wave equations with focusing power-type nonlinearity i t u = - \, u - |u|p-1 u, with (t,x) ∈ × d with exponents 1 < p < ∞ for d=1 and 1 < p < (d+1)/(d-1) for d ≥ 2. We study traveling solitary waves of the form u(t,x) = eiω t Qv(x-vt) with frequency ω ∈ , velocity v ∈ d, and some finite-energy profile Qv ∈ H1/2(d), Qv 0. We prove that traveling solitary waves for speeds |v| ≥ 1 do not exist. Furthermore, we generalize the non-existence result to the square root Klein--Gordon operator -+m2 and other nonlinearities. As a second main result, we show that small data scattering fails to hold for the focusing half-wave equation in any space dimension. The proof is based on the existence and properties of traveling solitary waves for speeds |v| < 1. Finally, we discuss the energy-critical case when p=(d+1)/(d-1) in dimensions d ≥ 2.