Global attraction to solitary waves in models based on the Klein-Gordon equation.

Komech, Alexander I.; Komech, Andrew A.

Displaying similar documents to “Global attraction to solitary waves in models based on the Klein-Gordon equation.”

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Space-time resonances

Pierre Germain (2010)

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This article is a short exposition of the space-time resonances method. It was introduced by Masmoudi, Shatah, and the author, in order to understand global existence for nonlinear dispersive equations, set in the whole space, and with small data. The idea is to combine the classical concept of resonances, with the feature of dispersive equations: wave packets propagate at a group velocity which depends on their frequency localization. The analytical method which follows from this idea...

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Nonlinear Pulse Propagation

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This talk gives a brief review of some recent progress in the asymptotic analysis of short pulse solutions of nonlinear hyperbolic partial differential equations. This includes descriptions on the scales of geometric optics and diffractive geometric optics, and also studies of special situations where pulses passing through focal points can be analysed.

Classical solutions of the perturbed wave equation with singular potential.

Vaidya, A., Sparling, A.J. (2003)

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Long-time asymptotics of solutions to some nonlinear wave equations

Grzegorz Karch (2000)

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In this paper, we survey some recent results on the asymptotic behavior, as time tends to infinity, of solutions to the Cauchy problems for the generalized Korteweg-de Vries-Burgers equation and the generalized Benjamin-Bona-Mahony-Burgers equation. The main results give higher-order terms of the asymptotic expansion of solutions.

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A viscoelastic Kirchhoff equation with Balakrishnan-Taylor damping is considered. Using integral inequalities and multiplier techniques we establish polynomial decay estimates for the energy of the problem. The results obtained in this paper extend previous results by Tatar and Zaraï [25].

$N$ -wave equations with orthogonal algebras: $ℤ_{2}$ and $ℤ_{2} \times ℤ_{2}$ reductions and soliton solutions.

Gerdjikov, Vladimir S., Kostov, Nikolay A., Valchev, Tihomir I. (2007)

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