On the stability of multibreathers in Klein–Gordon chains

Koukouloyannis, V.; Kevrekidis, P. G.

doi:10.1088/0951-7715/22/9/011

Cited by 45 publications

(70 citation statements)

References 25 publications

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“…We close the comments on the GdNLS with the remark that it could be the starting point for several applications which concern the Klein-Gordon model, like the variational approximations for breather solutions (see, e.g., [7,8]), the approximation of the small amplitude Cauchy problem, the existence and linear stability of multibreathers (see, e.g., [15,16,20,21]). Moreover there are several recent works on models with more than first neighbor interactions or with different nonlinearities, like [6,17,23,26] where spatially localized periodic orbits, as breathers or multibreathers, are studied: with respect to this, we expect that the approach proposed in the present paper can be suitably extended in these more general models, leading to different GdNLS-like normal forms.…”

Section: Introduction and Statement Of The Resultsmentioning

confidence: 68%

An extensive resonant normal form for an arbitrary large Klein–Gordon model

Paleari

Penati

2014

Annali di Matematica

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We consider a finite but arbitrarily large Klein-Gordon chain, with periodic boundary conditions. In the limit of small couplings in the nearest neighbor interaction, and small (total or specific) energy, a high order resonant normal form is constructed with estimates uniform in the number of degrees of freedom. In particular, the first order normal form is a generalized discrete nonlinear Schrödinger model, characterized by all-to-all sites coupling with exponentially decaying strength.

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Section: Introduction and Statement Of The Resultsmentioning

confidence: 68%

An extensive resonant normal form for an arbitrary large Klein–Gordon model

Paleari

Penati

2014

Annali di Matematica

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“…Since the action J i remains constant along an orbit in the anticontinuum limit, x i depends only on w i . So, the average value of H 1 becomes ( [22] appendix A)…”

Section: A Persistence Of Mutibreathersmentioning

confidence: 99%

Multibreathers in Klein–Gordon chains with interactions beyond nearest neighbors

Koukouloyannis

Cuevas

Rothos

2013

Physica D: Nonlinear Phenomena

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We study the existence and stability of multibreathers in Klein-Gordon chains with interactions that are not restricted to nearest neighbors. We provide a general framework where such long range effects can be taken into consideration for arbitrarily varying (as a function of the node distance) linear couplings between arbitrary sets of neighbors in the chain. By examining special case examples such as three-site breathers with next-nearest-neighbors, we find crucial modifications to the nearest-neighbor picture of one-dimensional oscillators being excited either in-or anti-phase. Configurations with nontrivial phase profiles emerge from or collide with the ones with standard (0 or π) phase difference profiles, through supercritical or subcritical bifurcations respectively. Similar bifurcations emerge when examining four-site breathers with either next-nearest-neighbor or even interactions with the three-nearest one-dimensional neighbors. The latter setting can be thought of as a prototype for the two-dimensional building block, namely a square of lattice nodes, which is also examined. Our analytical predictions are found to be in very good agreement with numerical results.

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“…In particular, exploring the limit of weak coupling between the nonlinear oscillators, existence [26] and stability [2,4] of the fundamental (single-site) breathers were established (see also the recent works in [30,31]). More complicated multi-breathers were classified from the point of their spectral stability in the recent works [1,25,33]. Nonlinear stability and instability of multi-site breathers were recently studied in [13].…”

Section: Introductionmentioning

confidence: 99%

Approximation of small-amplitude weakly coupled oscillators by discrete nonlinear Schrödinger equations

2016

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Small-amplitude weakly coupled oscillators of the Klein-Gordon lattices are approximated by equations of the discrete nonlinear Schrödinger type. We show how to justify this approximation by two methods, which have been very popular in the recent literature. The first method relies on a priori energy estimates and multi-scale decompositions. The second method is based on a resonant normal form theorem. We show that although the two methods are different in the implementation, they produce equivalent results as the end product. We also discuss applications of the discrete nonlinear Schrödinger equation in the context of existence and stability of breathers of the Klein-Gordon lattice.

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On the stability of multibreathers in Klein–Gordon chains

Cited by 45 publications

References 25 publications

An extensive resonant normal form for an arbitrary large Klein–Gordon model

An extensive resonant normal form for an arbitrary large Klein–Gordon model

Multibreathers in Klein–Gordon chains with interactions beyond nearest neighbors

Approximation of small-amplitude weakly coupled oscillators by discrete nonlinear Schrödinger equations

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