Scattering for the one-dimensional Klein-Gordon equation with exponential nonlinearity

Abstract

We consider the asymptotic behavior of solutions to the Cauchy problem for the defocusing nonlinear Klein-Gordon equation (NLKG) with exponential nonlinearity in the one spatial dimension with data in the energy space H1(R) × L2(R). We prove that any energy solution has a global bound of the L6t,x space-time norm, and hence scatters in H1(R) × L2(R) as t→ ∞. The proof is based on the argument by Killip-Stovall-Visan (Trans. Amer. Math. Soc. 364 (2012), no. 3, 1571--1631). However, since well-posedness in H1/2(R) × H-1/2(R) for NLKG with the exponential nonlinearity holds only for small initial data, we use the Lt6 Ws-1/2,6x-norm for some s>12 instead of the Lt,x6-norm, where Wxs,p denotes the s-th order Lp-based Sobolev space.