Tetsu Mizumachi scite author profile

We establish an asymptotic stability result for Toda lattice soliton solutions, by making use of a linearized Bäcklund transformation whose domain has codimension one. Combining a linear stability result with a general theory of nonlinear stability by Friesecke and Pego for solitary waves in lattice equations, we conclude that all solitons in the Toda lattice are asymptotically stable in an exponentially weighted norm. In addition, we determine the complete spectrum of an operator naturally associated with the Floquet theory for these lattice solitons.

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Asymptotic stability of small solitary waves to 1D nonlinear Schrödinger equations with potential

Mizumachi¹

2008

Kyoto J. Math.

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We consider asymptotic stability of a small solitary wave to supercritical 1-dimensional nonlinear Schrödinger equationsin the energy class. This problem was studied by in the 3-dimensional case using the endpoint Strichartz estimate.To prove asymptotic stability of solitary waves, we need to show that a dispersive part v(t, x) of a solution belongs to L 2 t (0, ∞; X) for some space X. In the 1-dimensional case, this property does not follow from the Strichartz estimate alone.In this paper, we prove that a local smoothing estimate of Kato type holds globally in time and combine the estimate with the Strichartz estimate to show (1+x 2 ) −3/4 v L ∞ x L 2 t < ∞, which implies the asymptotic stability of a solitary wave.

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Stability of the line soliton of the KP-II equation under periodic transverse perturbations

Mizumachi

Tzvetkov

2011

Math. Ann.

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Tetsu Mizumachi

On Asymptotic Stability in Energy Space of Ground States for Nonlinear Schrödinger Equations

Stability of line solitons for the KP-II equation in ℝ²

Asymptotic stability of Toda lattice solitons

Asymptotic stability of small solitary waves to 1D nonlinear Schrödinger equations with potential

Stability of the line soliton of the KP-II equation under periodic transverse perturbations

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