Instability of the solitary wave solutions for the genenalized derivative Nonlinear Schr\"odinger equation in the critical frequency case

Abstract

We study the stability theory of solitary wave solutions for the generalized derivative nonlinear Schr\"odinger equation i∂tu+∂x2u+i|u|2σ∂x u=0. The equation has a two-parameter family of solitary wave solutions of the form align* φω,c(x)=ω,c(x)\ i c2 x-i2σ+2∫-∞x2σω,c(y)dy\. align* Here ω,c is some real-valued function. It was proved in LiSiSu1 that the solitary wave solutions are stable if -2ω <c <2z0ω , and unstable if 2z0ω <c <2ω for some z0∈(0,1). We prove the instability at the borderline case c =2z0ω for 1<σ<2, improving the previous results in Fu-16-DNLS where 3/2<σ<2.