Instability of the standing waves for the nonlinear Klein-Gordon equations in one dimension

Abstract

In this paper, we consider the following nonlinear Klein-Gordon equation align* ∂ttu- u+u=|u|p-1u, t∈ R,\ x∈ Rd, align* with 1<p< 1+4d. The equation has the standing wave solutions uω=eiω tφω with the frequency ω∈(-1,1), where φω obeys align* - φ+(1-ω2)φ-φp=0. align* It was proved by Shatah (1983), and Shatah, Strauss (1985) that there exists a critical frequency ωc∈ (0,1) such that the standing waves solution uω is orbitally stable when ωc<|ω|<1, and orbitally unstable when |ω|<ωc. Further, the critical case |ω|=ωc in the high dimension d 2 was considered by Ohta, Todorova (2007), who proved that it is strongly unstable, by using the virial identities and the radial Sobolev inequality. The one dimension problem was left after then. In this paper, we consider the one-dimension problem and prove that it is orbitally unstable when |ω|=ωc.