Add to ORKGWe investigate the existence and stability of gap vortices and multipole gap solitons in a kagome lattice with a defocusing nonlinearity both in a discrete case and in a continuum one with periodic external modulation. In particular, predictions are made based on expansion around a simple and analytically tractable anticontinuum (zero-coupling) limit. These predictions are then confirmed for a continuum model of an optically induced kagome lattice in a photorefractive crystal obtained by a continuous transformation of a honeycomb lattice
Kagome lattices represent an archetype of intriguing physics, attracting a great deal of interest in...
In this paper we analyze the existence, stability, dynamical formation, and mobility properties of l...
Strongly correlated systems on geometrically frustrated lattices can stabilize a large number of int...
We investigate the existence and stability of gap vortices and multipole gap solitons in a kagome la...
The localized mode propagation in binary nonlinear kagome ribbons is investigated with the premise t...
We study the existence and stability of localized states in the discrete nonlinear Schrödinger equat...
We demonstrate a possibility to generate localized states in effectively one-dimensional Bose-Einste...
We consider a prototypical dynamical lattice model, namely, the discrete nonlinear Schrödinger equat...
We report the finding of the analogous valley Hall effect in phononic systems arising from mirror sy...
Solitons and necklaces in the first band gap of a two-dimensional optically induced honeycomb defocu...
In this work we study structural features of interest in the kagome lattice in order to provide a be...
We generalize the concept of nonlinear periodic structures to systems that show arbitrary spacetime ...
We study the non-trivial phase of the two-dimensional breathing kagome lattice, displaying both edge...
We examine localization of light in nonlinear (Kerr) kagome lattices in the shape of narrow strips o...
We construct a variety of novel localized topological structures in the 3D discrete nonlinear Schröd...
Kagome lattices represent an archetype of intriguing physics, attracting a great deal of interest in...
In this paper we analyze the existence, stability, dynamical formation, and mobility properties of l...
Strongly correlated systems on geometrically frustrated lattices can stabilize a large number of int...
We investigate the existence and stability of gap vortices and multipole gap solitons in a kagome la...
The localized mode propagation in binary nonlinear kagome ribbons is investigated with the premise t...
We study the existence and stability of localized states in the discrete nonlinear Schrödinger equat...
We demonstrate a possibility to generate localized states in effectively one-dimensional Bose-Einste...
We consider a prototypical dynamical lattice model, namely, the discrete nonlinear Schrödinger equat...
We report the finding of the analogous valley Hall effect in phononic systems arising from mirror sy...
Solitons and necklaces in the first band gap of a two-dimensional optically induced honeycomb defocu...
In this work we study structural features of interest in the kagome lattice in order to provide a be...
We generalize the concept of nonlinear periodic structures to systems that show arbitrary spacetime ...
We study the non-trivial phase of the two-dimensional breathing kagome lattice, displaying both edge...
We examine localization of light in nonlinear (Kerr) kagome lattices in the shape of narrow strips o...
We construct a variety of novel localized topological structures in the 3D discrete nonlinear Schröd...
Kagome lattices represent an archetype of intriguing physics, attracting a great deal of interest in...
In this paper we analyze the existence, stability, dynamical formation, and mobility properties of l...
Strongly correlated systems on geometrically frustrated lattices can stabilize a large number of int...