Existence and linearized stability of solitary waves for a quasilinear Benney system

Abstract

We prove the existence of solitary wave solutions to the quasilinear Benney system iut+uxx=a|u|pu+uv, vt+f(v)x=(|u|2)x where f(v)=-γ v3, -1<p<+∞ and a,γ>0. We establish, in particular, the existence of travelling waves with speed arbitrary large if p<0 and arbitrary close to 0 if p> 23. We also show the existence of standing waves in the case -1<p≤ 23, with compact support if -1<p<0.\\ Finally, we obtain, under certain conditions, the linearized stability of such solutions.