Invariant Virtual Solitary Manifold of the Perturbed Sine-Gordon Equation

Abstract

We study the perturbed sine-Gordon equation θtt-θxx+ θ= F(,x), where we assume that the perturbation F is analytic in and that its derivatives with respect to satisfy certain bounds at =0. We construct implicitly an, adjusted to the perturbation F, virtual solitary manifold, which is invariant in the following sense: The initial value problem for the perturbed sine-Gordon equation with an appropriate initial state on the constructed manifold has a unique solution, which follows a trajectory on the virtual solitary manifold. The trajectory is precisely described by two parameters, which satisfy a specific system of ODEs. The approach is based on the work of Mashkin (arXiv:1705.05713), where we constructed by an iteration scheme a virtual solitary manifold for the perturbed sine-Gordon equation. In arXiv:1705.05713 we proved a stability result for the perturbed sine-Gordon equation with initial data close to the virtual solitary manifold. The employed iteration scheme produces a sequence of virtual solitary manifolds such that the accuracy of the corresponding stability statements increases after each iteration step, as long as the perturbation F is sufficiently often differentiable. The invariant virtual solitary manifold constructed in this work is generated as a limit of the virtual solitary manifolds produced by the iteration scheme. The method and the kind of result presented in this paper is to our knowledge a novelty in the field of stability of solitons.