Homoclinic snaking near a heteroclinic cycle in reversible systems

Knobloch, Jürgen; Wagenknecht, Thomas

doi:10.1016/j.physd.2005.04.018

Cited by 78 publications

(79 citation statements)

References 19 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…These dark solitons are connected by unstable solution branches that serve to add additional spatial oscillations in their profiles, leading to the broadening of the dark states. This type of bifurcation structure is called collapsed snaking [16,17,41,42], which is significantly different from the homoclinic snaking appearing for dissipative solitons associated with subcritical patterns. Such homoclinic snaking, where many solutions coexist over a fixed parameter range around the Maxwell point, is probably better known and has been widely studied in physics [43,44] and optics [13,[45][46][47].…”

Section: Modification Of the Bifurcation Structure Of The Solitonsmentioning

confidence: 92%

Coexistence of stable dark- and bright-soliton Kerr combs in normal-dispersion resonators

2017

View full text Add to dashboard Cite

Using the Lugiato-Lefever model, we analyze the effects of third-order chromatic dispersion on the existence and stability of dark-and bright-soliton Kerr frequency combs in the normal dispersion regime. While in the absence of third-order dispersion only dark solitons exist over an extended parameter range, we find that third-order dispersion allows for stable dark and bright solitons to coexist. Reversibility is broken and the shape of the switching waves connecting the top and bottom homogeneous solutions is modified. Bright solitons come into existence thanks to the generation of oscillations in the switching-wave profiles. Temporal oscillatory instabilities of dark solitons are suppressed in the presence of sufficiently strong third-order dispersion, while bright solitons are never found to oscillate in time. As a result of third-order dispersion both bright and dark solitons are found to move with a velocity that depends on their width.

show abstract

Section: Modification Of the Bifurcation Structure Of The Solitonsmentioning

confidence: 92%

Coexistence of stable dark- and bright-soliton Kerr combs in normal-dispersion resonators

2017

View full text Add to dashboard Cite

show abstract

“…States of this type expand abruptly in the extended direction near a special point in parameter space corresponding to the formation of a pair of heteroclinic connections between two different fixed points in a spatial dynamics view of the system. 26 This point, variously referred to as the nonsnaking 35 or protosnaking 36 point plays the role of a Maxwell point in systems, like the Swift-Hohenberg equation (1), with gradient dynamics. If the spatial eigenvalues of one of the fixed points are complex the resulting behavior may be termed collapsed snaking.…”

Section: Discussionmentioning

confidence: 99%

Nonsnaking doubly diffusive convectons and the twist instability

2013

View full text Add to dashboard Cite

Doubly diffusive convection in a three-dimensional horizontally extended domain with a square cross section in the vertical is considered. The fluid motion is driven by horizontal temperature and concentration differences in the transverse direction. When the buoyancy ratio N = −1 and the Rayleigh number is increased the conduction state loses stability to a subcritical, almost two-dimensional roll structure localized in the longitudinal direction. This structure exhibits abrupt growth in length near a particular value of the Rayleigh number but does not snake. Prior to this filling transition the structure becomes unstable to a secondary twist instability generating a pair of stationary, spatially localized zigzag states. In contrast to the primary branch these states snake as they grow in extent and eventually fill the whole domain. The origin of the twist instability and the properties of the resulting localized structures are investigated for both periodic and no-slip boundary conditions in the extended direction. C 2013 AIP Publishing LLC. [http://dx

show abstract

“…In the analysis in Section 4, we will particularly focus on the case where ω is the first passage past p 2 , and we will discuss other possibilities only briefly. This paper can be seen as a follow-up to [10], where we discussed one-homoclinic orbits near an EE cycle. There it has also be shown that p 2 has to be of saddle-focus type, in order to find snaking behaviour of one-homoclinic orbits.…”

Section: Introductionmentioning

confidence: 97%

“…This feature allows one to study the scenario using a local bifurcation analysis. In an earlier paper [10] it has been shown rigorously by the authors that heteroclinic cycles between symmetric equilibria of saddle focus type generate a snaking behaviour. In contrast to that behaviour the snaking related to an EP cycle is generically a global phenomenon.…”

Section: Introductionmentioning

confidence: 98%

See 1 more Smart Citation

Snaking of Multiple Homoclinic Orbits in Reversible Systems

Knobloch¹,

Wagenknecht²

2008

SIAM J. Appl. Dyn. Syst.

Self Cite

View full text Add to dashboard Cite

We study N -homoclinic orbits near a heteroclinic cycle in a reversible system. The cycle is assumed to connect two equilibria of saddle-focus type. Using Lin's method we establish the existence of infinitely many N -homoclinic orbits for each N near the cycle. In particular, these orbits exist along snaking curves, thus mirroring the behaviour one-homoclinic orbits. The general analysis is illustrated by numerical studies for a Swift-Hohenberg system.

show abstract

Homoclinic snaking near a heteroclinic cycle in reversible systems

Cited by 78 publications

References 19 publications

Coexistence of stable dark- and bright-soliton Kerr combs in normal-dispersion resonators

Coexistence of stable dark- and bright-soliton Kerr combs in normal-dispersion resonators

Nonsnaking doubly diffusive convectons and the twist instability

Snaking of Multiple Homoclinic Orbits in Reversible Systems

Contact Info

Product

Resources

About