Long-time asymptotics of (1,3)-sign solitary waves for the damped nonlinear Klein-Gordon equation

Abstract

We consider the damped nonlinear Klein-Gordon equation: align* ∂t2u- u+2α ∂tu+u-|u|p-1u=0, \ & (t,x) ∈ R × Rd, align* where α>0, 2≤ d≤ 5 and energy sub-critical exponents p>2. In this paper, we prove that any solution which is asymptotic to a superposition of four solitons with exactly one soliton of opposite sign evolves so that the three like-signed solitons spread out in an equilateral-triangle configuration centered at the oppositely signed soliton.