Conditional stability of multi-solitons for the 1D NLKG equation with double power nonlinearity

Abstract

We consider the one-dimensional nonlinear Klein-Gordon equation with a double power focusing-defocusing nonlinearity equation* ∂t2u-∂x2u+u-|u|p-1u+|u|q-1u=0, on\ [0,∞)× R, equation* with 1<q<p<∞. The main result states the stability in the energy space H1(R)× L2(R) of the sums of decoupled solitary waves with different speeds, up to the natural instabilities. The proof is inspired by the techniques developed for the generalized Korteweg-de Vries equation and the nonlinear Schr\"odinger equation in a similar context by Martel, Merle and Tsai [14,15]. However, the adaptation of this strategy to a wave-type equation requires the introduction of a new energy functional adapted to the Lorentz transform.