Weak stability of the sum of two solitary waves for Half-wave equation

Abstract

In this paper, we consider the subcritical half-wave equation in one dimension. Let Rk(t,x), k=1,2, represent two-solitary wave solutions of the half-wave equation, each with different translations x1,x2. We prove that if the relative distance x2-x1 between the two solitary waves is large enough, then the sum of Rk(t) is weakly stable. Our proof relies on an energy method and the local mass monotonicity property. Unlike the single-solitary wave or NLS cases, the interactions between different waves are significantly stronger here. To establish the local mass monotonicity property, as well as to analyze non-local effects on localization functions and non-local operator D, we utilize the Carlder\'on estimate and the integral representation formula of the half-wave operator.