Instability of the solitary waves for the generalized Boussinesq equations

Abstract

In this work, we consider the following generalized Boussinesq equation align* ∂t2u-∂x2u+∂x2(∂x2u+|u|pu)=0, (t,x)∈ R× R, align* with 0<p<∞. This equation has the traveling wave solutions φω(x-ω t), with the frequency ω∈ (-1,1) and φω satisfying align* -∂xxφω+(1-ω2)φω-φωp+1=0. align* Bona and Sachs (1988) proved that the traveling wave φω(x-ω t) is orbitally stable when 0<p<4, p4<ω2<1. Liu (1993) proved the orbital instability under the conditions 0<p<4, ω2< p4 or p 4, ω2<1. In this paper, we prove the orbital instability in the degenerate case 0<p<4,ω2= p4 .