Hamiltonian equations for multiple-collective-variable theories of nonlinear Klein-Gordon equations: A projection-operator approach

Boesch, R.; Stancioff, P.; Willis, C. R.

doi:10.1103/physrevb.38.6713

Cited by 103 publications

(56 citation statements)

References 11 publications

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“…Of particular relevance to our work are the more recent articles of Boesch, Willis and coworkers [59,54,8,9,11,10]. In this work the discrete sine-Gordon equation is solved with kink-like initial data on the lattice.…”

Section: Introductionmentioning

confidence: 99%

Dynamics of lattice kinks

Kevrekidis

Weinstein

2000

Physica D: Nonlinear Phenomena

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We consider a class of Hamiltonian nonlinear wave equations governing a field defined on a spatially discrete one dimensional lattice, with discreteness parameter, d = h −1 , where h > 0 is the lattice spacing. The specific cases we consider in detail are the discrete sine-Gordon (SG) and discrete φ 4 models. For finite d and in the continuum limit (d → ∞) these equations have static kink-like (heteroclinic) states which are stable. In contrast to the continuum case, due to the breaking of Lorentz invariance, discrete kinks cannot be "Lorentz boosted" to obtain traveling discrete kinks. Peyrard and Kruskal pioneered the study of how a kink, initially propagating in the lattice dynamically adjusts in the absence of an available family of traveling kinks. We study in detail the final stages of the discrete kink's evolution during which it is pinned to a specified lattice site (equilibrium position in the Peierls-Nabarro barrier). We find: (i) for d sufficiently large (sufficiently small lattice spacing), the state of the system approaches an asymptotically stable ground state static kink (centered between lattice sites).(ii) for d sufficiently small d < d * the static kink bifurcates to one or more time periodic states. For the discrete φ 4 we have: wobbling kinks which have the same spatial symmetry as the static kink as well as "g-wobblers" and "e-wobblers", which have different spatial symmetry. In the discrete sine-Gordon case, the "ewobbler" has the spatial symmetry of the kink whereas the "g-wobbler" has the opposite one. These time-periodic states may be regarded as a class of discrete breather / topological defect states; they are spatially localized and time periodic oscillations mounted on a static kink background.The large time limit of solutions with initial data near a kink is marked by damped oscillation about one of these two types of asymptotic states. In case (i) we compute the characteristics of the damped oscillation (frequency and d-dependent rate of decay). In case (ii) we prove the existence of, and give analytical and numerical evidence for the asymptotic stability of wobbling solutions. * Department of Physics and Astronomy, Rutgers University, Piscataway, NJ 08854-8019 USA † Mathematical Sciences Research, Bell Laboratories -Lucent Technologies, and Department of Mathematics, University of Michigan -Ann Arbor, 600 Mountain Avenue, Murray Hill, NJ 07974-0636 USA 1The mechanism for decay is the radiation of excess energy, stored in internal modes, away from the kink core to infinity. This process is studied in detail using general techniques of scattering theory and normal forms. In particular, we derive a dispersive normal form, from which one can anticipate the character of the dynamics. The methods we use are very general and are appropriate for the study of dynamical systems which may be viewed as a system of discrete oscillators (e.g. kink together with its internal modes) coupled to a field (e.g. dispersive radiation or phonons). The approach is based on and extends an approach...

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Section: Introductionmentioning

confidence: 99%

Dynamics of lattice kinks

Kevrekidis

Weinstein

2000

Physica D: Nonlinear Phenomena

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“…Here, we note that our coarse-grain description is a special interpretation of the more general method of collective coordinates/variables, which has been put on solid theoretical ground [10] and become part of the textbooks on solitons [5]. The latter approach made its debut in the study of resonances and collisions of solitary waves in the so-called φ 4 equation [11,12], a close relative of the SGE, and the study of two-soliton interactions in the SGE [13,14].…”

Section: Introductionmentioning

confidence: 99%

Physical dynamics of quasi-particles in nonlinear wave equations

Christov

2008

Physics Letters A

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By treating the centers of solitons as point particles and studying their discrete dynamics, we demonstrate a new approach to the quantization of the soliton solutions of the sine-Gordon equation, one of the first model nonlinear field equations. In particular, we show that a linear superposition of the non-interacting shapes of two solitons offers a qualitative (and to a good approximation quantitative) description of the true two-soliton solution, provided that the trajectories of the centers of the superimposed solitons are considered unknown. Via variational calculus, we establish that the dynamics of the quasi-particles obey a pseudo-Newtonian law, which includes cross-mass terms. The successful identification of the governing equations of the (discrete) quasi-particles from the (continuous) field equation shows that the proposed approach provides a basis for the passage from the continuous to a discrete description of the field.

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“…In this context, it is appropriate to simplify the characterization of the pulse by using a set of parameters (collective coordinates) that best describe the major physical characteristics of the optical pulse [13].…”

Section: Collective Variables Approachmentioning

confidence: 99%

Efficient Approach for 3D Stationary Optical Solitons in Dissipative Systems

Konaté¹,

Soro²,

Asseu³

et al. 2015

JAMP

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We feature the stationary solutions of the 3D complex cubic-quintic Ginzburg-Landau equation (CGLE). Our approach is based on collective variables approach which helps to obtain a system of variational equations, giving the evolution of the light pulses parameters as a function of the propagation distance. The collective variables approach permits us to obtain, efficiently, a global mapping of the 3D stationary dissipative solitons. In addition it allows describing the influence of the parameters of the equation on the various physical parameters of the pulse and their dynamics. Thus it helps to show the impact of dispersion and nonlinear gain on the stationary dynamic.

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Hamiltonian equations for multiple-collective-variable theories of nonlinear Klein-Gordon equations: A projection-operator approach

Cited by 103 publications

References 11 publications

Dynamics of lattice kinks

Dynamics of lattice kinks

Physical dynamics of quasi-particles in nonlinear wave equations

Efficient Approach for 3D Stationary Optical Solitons in Dissipative Systems

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