Nonlinear modulational stability of periodic traveling-wave solutions of the generalized Kuramoto–Sivashinsky equation

Barker, Blake; Johnson, Mathew A.; Noble, Pascal; Rodrigues, Luis Miguel; Zumbrun, Kevin

doi:10.1016/j.physd.2013.04.011

Cited by 56 publications

(104 citation statements)

References 61 publications

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“…The existence and stability of two-pulse solutions in the fifth-order KdV equation are studied in [12]. The nonlinear stability of the periodic solutions of the gKS equation has been resolved only recently [6]. For one-dimensional "local" equations with translational invariance, the dynamical systems approach can be employed to analyze pulse solutions.…”

mentioning

confidence: 99%

Coherent Structures in Nonlocal Dispersive Active-Dissipative Systems

Lin¹,

Pradas

Kalliadasis

et al. 2015

SIAM J. Appl. Math.

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Abstract. We analyze coherent structures in nonlocal dispersive active-dissipative nonlinear systems, using as a prototype the Kuramoto-Sivashinsky (KS) equation with an additional nonlocal term that contains stabilizing/destabilizing and dispersive parts. As for the local generalized Kuramoto-Sivashinsky (gKS) equation (see, e.g., [T. Kawahara and S. Toh, Phys. Fluids, 31 (1988), pp. 2103-2111]), we show that sufficiently strong dispersion regularizes the chaotic dynamics of the KS equation, and the solutions evolve into arrays of interacting pulses that can form bound states. We analyze the asymptotic characteristics of such pulses and show that their tails tend to zero algebraically but not exponentially, as for the local gKS equation. Since the Shilnikov-type approach is not applicable for analyzing bound states in nonlocal equations, we develop a weak-interaction theory and show that the standard first-neighbor approximation is no longer applicable. It is then essential to take into account long-range interactions due to the algebraic decay of the tails of the pulses. In addition, we find that the number of possible bound states for fixed parameter values is always finite, and we determine when there is long-range attractive or repulsive force between the pulses. Finally, we explain the regularizing effect of dispersion by showing that, as dispersion is increased, the pulses generally undergo a transition from absolute to convective instability. We also find that for some nonlocal operators, increasing the strength of the stabilizing/destabilizing term can have a regularizing/deregularizing effect on the dynamics.

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mentioning

confidence: 99%

Coherent Structures in Nonlocal Dispersive Active-Dissipative Systems

Lin¹,

Pradas

Kalliadasis

et al. 2015

SIAM J. Appl. Math.

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“…In particular, (D2) implies that one can take ( , 0) = ( ) because 0 ( ) = 0. Moreover, condition (D3) was verified by direct numerical Evans function analysis in [12].…”

Section: Spectral Stabilitymentioning

confidence: 86%

“…By using pointwise linear estimates together with a nonlinear iteration scheme developed by Johnson-Zumbrun, pointwise nonlinear stability of such 2 Advances in Mathematical Physics waves has been also studied in [2,3,10]. For other related works on modulated periodic traveling waves, we refer readers to [11][12][13].…”

Section: Introductionmentioning

confidence: 99%

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L1(R)-Nonlinear Stability of Nonlocalized Modulated Periodic Reaction-Diffusion Waves

Jung

2017

Advances in Mathematical Physics

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Assuming spectral stability conditions of periodic reaction-diffusion waves ( ), we consider 1 (R)-nonlinear stability of modulated periodic reaction-diffusion waves, that is, modulational stability, under localized small initial perturbations with nonlocalized initial modulations. (R)-nonlinear stability of such waves has been studied in for ≥ 2 by using Hausdorff-Young inequality. In this note, by using the pointwise estimates obtained in Jung, (2012)

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“…In order to determine if the traveling waves constructed above may be stable in some sense, we now study the above initial value problem numerically. Once the pair (φ, s) and the initial perturbation v are chosen, we numerically solve (2.5) by following the method used in [5]. Specifically, we use a Crank-Nicolson discretization in time together Figure 3, when subject to a localized perturbation.…”

Section: )mentioning

confidence: 99%

On the dynamics of traveling fronts arising in nanoscale pattern formation

Johnson

Lyng

Smith

2020

Physica D: Nonlinear Phenomena

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We study the stability and dynamics of traveling-front solutions of a modified Kuramoto-Sivashinsky equation arising in the modeling of nanoscale ripple patterns that form when a nominally flat solid surface is bombarded with a broad ion beam at an oblique angle of incidence. Structurally, the linearized operators associated with these fronts have unstable essential spectrum-corresponding to instability of the spatially asymptotic states-and stable point spectrum-corresponding to stability of the transition profile of the front. We show that these waves are linearly orbitally asymptotically stable in appropriate exponentially weighted spaces. While the technical device of exponential weights allows us to accommodate the unstable essential spectrum of individual waves in our linear analysis, it does not shed light on the long-time pattern formation that is observed experimentally and in numerical simulations. To begin to address this issue, we consider a periodic array of unstable front and back solutions. While not an exact solution of the governing equation, this periodic pattern mimics experimentally observed phenomena. Our numerical experiments suggest that the convecting instabilities associated with each individual wave are damped as they pass through transition layers and that this stabilization mechanism underlies the pattern formation seen in experiments.

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Nonlinear modulational stability of periodic traveling-wave solutions of the generalized Kuramoto–Sivashinsky equation

Cited by 56 publications

References 61 publications

Coherent Structures in Nonlocal Dispersive Active-Dissipative Systems

Coherent Structures in Nonlocal Dispersive Active-Dissipative Systems

L1(R)-Nonlinear Stability of Nonlocalized Modulated Periodic Reaction-Diffusion Waves

On the dynamics of traveling fronts arising in nanoscale pattern formation

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