Add to ORKGIn this work, a rigorous proof of the orbital stability of the black soliton solution of the quintic Gross-Pitaevskii equation in one spatial dimension is obtained. We first build and show explicitly black and dark soliton solutions and we prove that the corresponding Ginzburg-Landau energy is coercive around them by using some orthogonality conditions related to perturbations of the black and dark solitons. The existence of suitable perturbations around black and dark solitons satisfying the required orthogonality conditions is deduced from an Implicit Function Theorem. In fact, these perturbations involve dark solitons with sufficiently small speeds and some proportionality factors ari\-sing from the explicit expression of their spatial d...
For certain nonlinear Schroedinger equations there exist solutions which are called solitary waves. ...
AbstractIn this paper, we prove the nonlinear orbital stability of the stationary traveling wave of ...
Considered here is the Schrödinger-improved Boussinesq system. First we prove local and global well-...
International audienceWe establish the orbital stability of the black soliton, or kink solution, $\v...
International audienceWe introduce a new framework for the analysis of the stability of solitons for...
International audienceWe pursue our work on the dynamical stability of dark solitons for the one-dim...
We consider the persistence and stability of dark solitons in the Gross–Pitaevskii (GP) equation wit...
International audienceWe establish the stability in the energy space for sums of solitons of the one...
We study a defocusing quasilinear Schr\"odinger equation with nonzero conditions at infinity in dime...
We reformulate the Gross–Pitaevskii equation with an external parabolic potential as a discrete dyna...
We prove the asymptotic stability in the energy space of non-zero speed solitons for the one-dimensi...
We analyze the case of a dense mKdV soliton gas and its large time behaviour in the presence of a si...
In this paper, we prove a criterion determining if a black soliton solution to a one-dimensional non...
International audienceWe consider the one-dimensional Gross-Pitaevskii equation perturbed by a Dirac...
In this thesis, we study the existence and stability of background solutions (BGSs) and dark solito...
For certain nonlinear Schroedinger equations there exist solutions which are called solitary waves. ...
AbstractIn this paper, we prove the nonlinear orbital stability of the stationary traveling wave of ...
Considered here is the Schrödinger-improved Boussinesq system. First we prove local and global well-...
International audienceWe establish the orbital stability of the black soliton, or kink solution, $\v...
International audienceWe introduce a new framework for the analysis of the stability of solitons for...
International audienceWe pursue our work on the dynamical stability of dark solitons for the one-dim...
We consider the persistence and stability of dark solitons in the Gross–Pitaevskii (GP) equation wit...
International audienceWe establish the stability in the energy space for sums of solitons of the one...
We study a defocusing quasilinear Schr\"odinger equation with nonzero conditions at infinity in dime...
We reformulate the Gross–Pitaevskii equation with an external parabolic potential as a discrete dyna...
We prove the asymptotic stability in the energy space of non-zero speed solitons for the one-dimensi...
We analyze the case of a dense mKdV soliton gas and its large time behaviour in the presence of a si...
In this paper, we prove a criterion determining if a black soliton solution to a one-dimensional non...
International audienceWe consider the one-dimensional Gross-Pitaevskii equation perturbed by a Dirac...
In this thesis, we study the existence and stability of background solutions (BGSs) and dark solito...
For certain nonlinear Schroedinger equations there exist solutions which are called solitary waves. ...
AbstractIn this paper, we prove the nonlinear orbital stability of the stationary traveling wave of ...
Considered here is the Schrödinger-improved Boussinesq system. First we prove local and global well-...