Add to ORKGInternational audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equation. We find dislocations as traveling or standing waves connecting roll patterns with different wavenumbers in an infinite strip. The proof is based on a bifurcation analysis. Spatial dynamics and center-manifold reduction yield a reduced, coupled-mode system of differential equations. Existence of traveling dislocations is then established by showing that this reduced system possesses robust heteroclinic orbits
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
International audienceIn this paper we present an overview of pattern formation analysis for an anal...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
The bistable Swift-Hohenberg equation possesses a variety of time-independent spatially localized so...
We investigate the bifurcation structure of stationary localized patterns of the two dimensional Swi...
We investigate stationary spatially localized hexagon patterns of the two-dimensional (2D) Swift– Ho...
The complex Swift-Hohenberg equation models pattern formation arising from an oscillatory instabilit...
It is well-known that stationary localised patterns involving a periodic stripe core can undergo a p...
We investigate stationary spatially localized hexagon patterns of the two-dimensional (2D) Swift– Ho...
Stationary fronts connecting the trivial state and a cellular (distorted) hexagonal pattern in the S...
We develop a method for the stability analysis of bifurcating spatially periodic patterns under gene...
Abstract. Stable localized roll structures have been observed in many physical problems and model eq...
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
International audienceIn this paper we present an overview of pattern formation analysis for an anal...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
International audienceWe study the existence of dislocations in an anisotropic Swift-Hohenberg equat...
The bistable Swift-Hohenberg equation possesses a variety of time-independent spatially localized so...
We investigate the bifurcation structure of stationary localized patterns of the two dimensional Swi...
We investigate stationary spatially localized hexagon patterns of the two-dimensional (2D) Swift– Ho...
The complex Swift-Hohenberg equation models pattern formation arising from an oscillatory instabilit...
It is well-known that stationary localised patterns involving a periodic stripe core can undergo a p...
We investigate stationary spatially localized hexagon patterns of the two-dimensional (2D) Swift– Ho...
Stationary fronts connecting the trivial state and a cellular (distorted) hexagonal pattern in the S...
We develop a method for the stability analysis of bifurcating spatially periodic patterns under gene...
Abstract. Stable localized roll structures have been observed in many physical problems and model eq...
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
We apply analytical and numerical methods to study the linear stability of stripe patterns in two ge...
International audienceIn this paper we present an overview of pattern formation analysis for an anal...