Stability of multiple pulses in discrete systems

We study the structure and stability of nonlinear impurity modes in the discrete nonlinear Schrödinger equation with a single on-site nonlinear impurity emphasizing the effects of interplay between discreteness, nonlinearity and disorder. We show how the interaction of a nonlinear localized mode (a discrete soliton or discrete breather) with a repulsive impurity generates a family of stationary states near the impurity site, as well as examine both theoretical and numerical criteria for the transition between different localized states via a cascade of bifurcations.

show abstract

“…(3.5) in [29], as well as in references therein. Finally, it is worth mentioning that the series in Eq.…”

Section: Model and Analytical Resultsmentioning

confidence: 95%

Instabilities and bifurcations of nonlinear impurity modes

2003

View full text Add to dashboard Cite

show abstract

“…[24,25] for the corresponding 1D and 3D stability results). Gross features of these findings are that, whenever two adjacent sites are in-phase, a real eigenvalue pair is expected to emerge due to their interaction, while whenever such sites are out-ofphase, the relevant eigenvalue is expected to be imaginary [26], but with negative Krein signature [22], which implies a potential for a Hamiltonian-Hopf bifurcation. It should also be noted that, in the limit of the infinite lattice, it is naturally expected that the asymmetries observed herein in many of the branches will disappear (i.e., the amplitudes in different wells will be equal) -see also a relevant discussion in Ref.…”

Section: A Attractive Interactionsmentioning

confidence: 99%

Two-dimensional paradigm for symmetry breaking: The nonlinear Schrödinger equation with a four-well potential

et al. 2009

Self Cite

View full text Add to dashboard Cite

We study the existence and stability of localized states in the two-dimensional (2D) nonlinear Schrödinger (NLS)/Gross-Pitaevskii equation with a symmetric four-well potential. Using a fourmode approximation, we are able to trace the parametric evolution of the trapped stationary modes, starting from the corresponding linear limits, and thus derive the complete bifurcation diagram for the families of these stationary modes. The predictions based on the four-mode decomposition are found to be in good agreement with the numerical results obtained from the NLS equation. Actually, the stability properties coincide with those suggested by the corresponding discrete model in the large-amplitude limit. The dynamics of the unstable modes is explored by means of direct simulations. Finally, while we present the full analysis for the case of the focusing nonlinearity, the bifurcation diagram for the defocusing case is briefly considered too.

show abstract

“…(12)- (13) are retrieved, but with the RHS expression multiplied by cos(φ). This is rather natural as in-phase ALNLS solitons are expected to attract each other, while out-of-phase ones are expected to experience mutual repulsion [19,20,21]. …”

Section: Soliton Interactions In the Ablowitz-ladik Modelmentioning

confidence: 99%

“…We should mention here that for continuum systems, there exists a large variety of methods for computing such interactions. These range from the perturbation theoretical works of [18], to the variational methods of [19,20,21], the Fredholm-alternative based technique of [22] or the more rigorous calculations of [23] based on Lin's method. In a recent publication [24], we took an alternative route to these methods, by implementing an asymptotic calculation using the approach proposed by Manton [25] (which, in turn, was generalizing the earlier work of [26]).…”

Section: Introductionmentioning

confidence: 99%

“…One of the complications is that, aside from the tail-tail interaction of the waves, each wave may also reside on a periodic substrate potential, usually termed the Peierls-Nabarro barrier [12]. As a result, except for the (typically exponential in the wave separation) tail-induced potential, a local potential may arise due to discreteness, resulting in a washboard potential structure which can be captured by variational techniques [20,21].…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Asymptotic calculation of discrete non-linear wave interactions

Kevrekidis¹,

Khare²,

Saxena³

et al. 2007

Mathematics and Computers in Simulation

View full text Add to dashboard Cite

Abstract. We illustrate how to compute asymptotic interactions between discrete solitary waves of dispersive equations, using the approach proposed by Manton [Nucl. Phys. B 150, 397 (1979)]. We also discuss the complications arising due to discreteness and showcase the application of the method in nonlinear Schrödinger, as well as in Klein-Gordon lattices, finding excellent agreement with direct numerical computations.

show abstract

Stability of multiple pulses in discrete systems

Cited by 65 publications

References 38 publications

Instabilities and bifurcations of nonlinear impurity modes

Instabilities and bifurcations of nonlinear impurity modes

Two-dimensional paradigm for symmetry breaking: The nonlinear Schrödinger equation with a four-well potential

Asymptotic calculation of discrete non-linear wave interactions

Contact Info

Product

Resources

About