Exponential asymptotics of homoclinic snaking

Dean, Andrew; Matthews, P. C.; Cox, Stephen M.; King, John R.

doi:10.1088/0951-7715/24/12/003

Cited by 33 publications

(60 citation statements)

References 35 publications

(71 reference statements)

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“…Such a refinement may appear superfluous at first sight, but close to the codimension-2 point, the width of the pinning range becomes so thin that the leading order calculation becomes insufficiently accurate. This was noted before in the two instances where a beyond-all-order analysis was carried out [37,40,44] and will be illustrated by comparing our results with the pinning range numerically computed by Gomilà, Scroggie, Firth in [31].…”

Section: Introductionsupporting

confidence: 75%

“…As a result, a large number of spatial discretization points are necessary and the equations must be integrated for a long time before reaching a stable state. Moreover, the domain of existence of localized patterns in the parameter space is exponentially thin [37,40,44] and can therefore easily be missed. The aim of this paper, therefore, is to locate the region in parameter space where localized patterns can be found for two important classes of optical models.…”

Section: Introductionmentioning

confidence: 99%

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Localized Turing patterns in nonlinear optical cavities

Kozyreff

2012

Physica D: Nonlinear Phenomena

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The subcritical Turing instability is studied in two classes of models for laser-driven nonlinear optical cavities. In the first class of models, the nonlinearity is purely absorptive, with arbitrary intensity-dependent losses. In the second class, the refractive index is real and is an arbitrary function of the intra-cavity intensity. Through a weakly nonlinear analysis, a Ginzburg-Landau equation with quintic nonlinearity is derived. Thus, the Maxwell curve, which marks the existence of localized patterns in parameter space, is determined. In the particular case of the Lugiato-Lefever model, the analysis is continued to seventh order, yielding a refined formula for the Maxwell curve and the theoretical curve is compared with recent numerical simulation by Gomilà, Firth, and Scroggie [Physica D 227, 70 (2007).]

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Section: Introductionsupporting

confidence: 75%

Section: Introductionmentioning

confidence: 99%

Localized Turing patterns in nonlinear optical cavities

Kozyreff

2012

Physica D: Nonlinear Phenomena

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“…For small q 1 q 3 > 0, then, provided q 1 q 5 < 0, an unfolding of the normal form shows that there is a heteroclinic connection from a background state to a nontrivial periodic orbit. Taking account of beyond-all-orders terms in the normal form [26,27] enables an analysis to be undertaken in which we find infinitely many homoclinic orbits arranged on two closed curves; see Fig. 3(b) below.…”

Section: Local Analysismentioning

confidence: 99%

Subcritical Turing bifurcation and the morphogenesis of localized patterns

Breña‐Medina

Champneys

2014

Phys. Rev. E

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Subcritical Turing bifurcations of reaction-diffusion systems in large domains lead to spontaneous onset of well-developed localized patterns via the homoclinic snaking mechanism. This phenomenon is shown to occur naturally when balancing source and loss effects are included in a typical reaction-diffusion system, leading to a super- to subcritical transition. Implications are discussed [corrected]for a range of physical problems, arguing that subcriticality leads to naturally robust phase transitions to localized patterns.

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“…For the 3-5 Swift-Hohenberg equation, the additional up-down symmetry (x → x, u → −u) admits two additional snaking branches of odd solutions (cf. [12,13]). In contrast to the 2-3 case, traversal through four saddle-nodes on one snaking branch is required to add two wavelengths at the edges of the spatially periodic region in the 3-5 Swift-Hohenberg equation (cf.…”

Section: Introductionmentioning

confidence: 99%

Homoclinic snaking near a codimension-two Turing-Hopf bifurcation point in the Brusselator model

Tzou

Bayliss

et al. 2013

Phys. Rev. E

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ABSTRACT. Spatiotemporal Turing-Hopf pinning solutions near the codimension two Turing-Hopf point of the one-dimensional Brusselator model are studied. Both the Turing and Hopf bifurcations are supercritical and stable. The pinning solutions exhibit coexistence of stationary stripes of near critical wavelength and time periodic oscillations near the characteristic Hopf frequency. Such solutions of this nonvariational problem are in contrast to the stationary pinning solutions found in the subcritical Turing regime for the variational Swift-Hohenberg equations, characterized by a spatially periodic pattern embedded in a spatially homogeneous background state.Numerical continuation was used to solve periodic boundary value problems in time for the Fourier amplitudes of the spatiotemporal Turing-Hopf pinning solutions. The solution branches are organized in a series of saddle-node bifurcations similar to the known snaking structures of stationary pinning solutions. We find two intertwined pairs of such branches, one with a defect in the middle of the striped region, and one without. Solutions on one branch of one pair differ from those on the other branch by a π phase shift in the spatially periodic region, i.e., locations of local minima of solutions on one branch correspond to locations of maxima of solutions on the other branch. These branches are connected to branches exhibiting collapsed snaking behavior, where the snaking region collapses to almost a single value in the bifurcation parameter. Solutions along various parts of the branches are described in detail. Time dependent depinning dynamics outside the saddle-nodes are illustrated, and a time scale for the depinning transitions is numerically established. Wavelength variation within the snaking region is discussed, and reasons for the variation are given in the context of amplitude equations. Finally, we compare the pinning region to the Maxwell line found numerically by time evolving the amplitude equations.

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Exponential asymptotics of homoclinic snaking

Cited by 33 publications

References 35 publications

Localized Turing patterns in nonlinear optical cavities

Localized Turing patterns in nonlinear optical cavities

Subcritical Turing bifurcation and the morphogenesis of localized patterns

Homoclinic snaking near a codimension-two Turing-Hopf bifurcation point in the Brusselator model

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