Add to ORKGWe present a unifying description of localized states observed in systems with coexistence of two spatially periodic states, called bi-pattern systems. Localized states are pinned over an underlying lattice that is either a self-organized pattern spontaneously generated by the system itself, or a periodic grid created by a spatial forcing. We show that localized states are generic and require only the coexistence of two spatially periodic states. Experimentally, these states have been observed in a nonlinear optical system. At the onset of the spatial bifurcation, a forced one-dimensional amplitude equation is derived for the critical modes, which accounts for the appearance of localized states. By numerical simulations, we show that locali...
In pattern-forming systems, localized patterns are states of intermediate complexity between fully e...
The theory of stationary spatially localized patterns in dissipative systems driven by time-independ...
We analyze stationary fronts connecting uniform and periodic states emerging from a pattern-forming ...
We present a unifying description close to a spatial bifurcation of localized states, appearing as l...
We present an unifying description of a new class of localized states, appearing as large amplitude ...
The formation of self-organized patterns and localized states are ubiquitous in Nature. Localized st...
We study the formation of localized structures in two-dimensional systems with periodic forcing, sho...
Systems driven far from thermodynamic equilibrium can create dissipative structures through the spon...
This dissertation studies nonlinear partial differential equations (PDEs) describing pattern formati...
International audienceIn this article we review the conditions for the appearance of localized state...
Abstract—We analytically and numerically study the role of the homogeneous zero mode on the interact...
We study the emergence of dissipative localized states in phase mismatched singly resonant optical p...
Two-dimensional spatially localized structures in the complex Ginzburg–Landau equation with 1:1 reso...
Dissipative localized structures exhibit intricate bifurcation diagrams. An adequate theory has been...
4 pagesIn a nonlinear optical experiment we report a unique class of localized structures, which app...
In pattern-forming systems, localized patterns are states of intermediate complexity between fully e...
The theory of stationary spatially localized patterns in dissipative systems driven by time-independ...
We analyze stationary fronts connecting uniform and periodic states emerging from a pattern-forming ...
We present a unifying description close to a spatial bifurcation of localized states, appearing as l...
We present an unifying description of a new class of localized states, appearing as large amplitude ...
The formation of self-organized patterns and localized states are ubiquitous in Nature. Localized st...
We study the formation of localized structures in two-dimensional systems with periodic forcing, sho...
Systems driven far from thermodynamic equilibrium can create dissipative structures through the spon...
This dissertation studies nonlinear partial differential equations (PDEs) describing pattern formati...
International audienceIn this article we review the conditions for the appearance of localized state...
Abstract—We analytically and numerically study the role of the homogeneous zero mode on the interact...
We study the emergence of dissipative localized states in phase mismatched singly resonant optical p...
Two-dimensional spatially localized structures in the complex Ginzburg–Landau equation with 1:1 reso...
Dissipative localized structures exhibit intricate bifurcation diagrams. An adequate theory has been...
4 pagesIn a nonlinear optical experiment we report a unique class of localized structures, which app...
In pattern-forming systems, localized patterns are states of intermediate complexity between fully e...
The theory of stationary spatially localized patterns in dissipative systems driven by time-independ...
We analyze stationary fronts connecting uniform and periodic states emerging from a pattern-forming ...