Instability of stationary solutions for double power nonlinear Schr\"odinger equations in one dimension

Abstract

We consider a double power nonlinear Schr\"odinger equation which possesses the algebraically decaying stationary solution φ0 as well as exponentially decaying standing waves eiω tφω(x) with ω>0. It is well-known from the general theory that stability properties of standing waves are determined by the derivative of ω M(ω):=12\|φω\|L22; namely eiω tφω with ω>0 is stable if M'(ω)>0 and unstable if M'(ω)<0. However, the stability/instability of stationary solutions is outside the general theory from the viewpoint of spectral properties of linearized operators. In this paper we prove the instability of the stationary solution φ0 in one dimension under the condition M'(0):=ω 0M'(ω)∈[-∞, 0). The key in the proof is the construction of the one-sided derivative of ωφω at ω=0, which is effectively used to construct the unstable direction of φ0.