Pierre Germain, Fabio Pusateri, Frédéric Rousset
Published 2015-03-31Version 1
We prove a full asymptotic stability result for solitary wave solutions of the mKdV equation. We consider small perturbations of solitary waves with polynomial decay at infinity and prove that solutions of the Cauchy problem evolving from such data tend uniformly, on the real line, to another solitary wave as time goes to infinity. We describe precisely the asymptotics of the perturbation behind the solitary wave showing that it satisfies a nonlinearly modified scattering behavior. This latter part of our result relies on a precise study of the asymptotic behavior of small solutions of the mKdV equation.
Nonlinear Fourier transforms and the mKdV equation in the quarter plane
Stability of the solitary wave solutions to a coupled BBM system
Sensitivity Analysis of the Current, the Electrostatic Capacity, and the Far-Field of the Potential with Respect to Small Perturbations in the Surface of a Conductor
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