Construction of multi solitary waves with symmetry for the damped nonlinear Klein-Gordon equation

Abstract

We are interested in the nonlinear damped Klein-Gordon equation \[ ∂t2 u+2α∂t u-Δu+u-|u|p-1u=0 \] on Rd for 2 d 5 and energy sub-critical exponents 2 < p < d+2d-2. We construct multi-solitons, that is, solutions which behave for large times as a sum of decoupled solitons, in various configurations with symmetry: this includes multi-solitons whose soliton centers lie at the vertices of an expanding regular polygon (with or without a center), of a regular polyhedron (with a center), or of a higher dimensional regular polytope. We give a precise description of these multi-solitons: in particular the interaction between nearest neighbour solitons is asymptotic to (t) as t +∞. We also prove that in any multi-soliton, the solitons can not all share the same sign. Both statements generalize and precise results from F98, Nak and are based on the analysis developed in CMYZ,CMY.