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Orbital stability vs. scattering in the cubic-quintic Schrödinger equation

Rémi Carles, Christof Sparber

2020Reviews in Mathematical Physics31 citationsDOIOpen Access PDF

Abstract

We consider the cubic-quintic nonlinear Schrödinger equation of up to three space dimensions. The cubic nonlinearity is thereby focusing while the quintic one is defocusing, ensuring global well-posedness of the Cauchy problem in the energy space. The main goal of this paper is to investigate the interplay between dispersion and orbital (in-)stability of solitary waves. In space dimension one, it is already known that all solitons are orbitally stable. In dimension two, we show that if the initial data belong to the conformal space, and have at most the mass of the ground state of the cubic two-dimensional Schrödinger equation, then the solution is asymptotically linear. For larger mass, solitary wave solutions exist, and we review several results on their stability. Finally, in dimension three, relying on previous results from other authors, we show that solitons may or may not be orbitally stable.

Topics & Concepts

Dimension (graph theory)PhysicsStability (learning theory)Space (punctuation)Nonlinear systemInitial value problemConformal mapScatteringDispersion (optics)Mathematical analysisDispersion relationMathematical physicsMathematicsSolitonGround stateWave equationQuantum mechanicsCauchy problemSpacetimeClassical mechanicsCauchy distributionNonlinear Schrödinger equationEnergy (signal processing)One-dimensional spaceAdvanced Mathematical Physics ProblemsNonlinear Waves and SolitonsNonlinear Photonic Systems