Add to ORKGThe ubiquitous Hofstadter butterfly describes a variety of systems characterized by incommensurable periodicities, ranging from Bloch electrons in magnetic fields and the quantum Hall effect to cold atoms in optical lattices and more. Here, we introduce nonlinearity into the underlying ( Harper) model and study the nonlinear spectra and the corresponding extended eigenmodes of nonlinear quasiperiodic systems. We show that the spectra of the nonlinear eigenmodes form deformed versions of the Hofstadter butterfly and demonstrate that the modes can be classified into two families: nonlinear modes that are a \u27continuation\u27 of the linear modes of the system and new nonlinear modes that have no counterparts in the linear spectrum. Finally, ...
Heterogeneity in lattice potentials (like random or quasiperiodic) can localize linear, non-interact...
We examine analytically and numerically the spectral properties of three quasi-one-dimensional latti...
Electrons moving through a spatially periodic lattice potential develop a quantized energy spectrum ...
We study quasiperiodicity-induced localization of waves in strongly precompressed granular chains. W...
Energy bands of electrons in a square lattice potential threaded by a uniform magnetic field exhibit...
International audienceThe energy spectrum of a tight-binding Hamiltonian is studied for the two-dime...
We describe a continuous analog of the quasirectangular flat-top nonlinear modes earlier found for d...
We investigate theoretically the spectrum of a graphenelike sample (honeycomb lattice) subjected to ...
The properties of the Hofstadter butterfly, a fractal, self-similar spectrum of a two-dimensional el...
Abstract Hofstadter showed that the energy levels of electrons on a lattice plotted as a function of...
The 'Hofstadter butterfly', a plot of the spectrum of an electron in a two-dimensional periodic pote...
The system of a cold atomic gas in an optical lattice is governed by two factors: nonlinearity origi...
Recent advances in realizing artificial gauge fields on optical lattices promise experimental detect...
Abstract Localization of waves by disorder is a fundamental physical problem en-compassing a diverse...
We explore the possibility of multi-site breather states in a nonlinear Klein–Gordon lattice to beco...
Heterogeneity in lattice potentials (like random or quasiperiodic) can localize linear, non-interact...
We examine analytically and numerically the spectral properties of three quasi-one-dimensional latti...
Electrons moving through a spatially periodic lattice potential develop a quantized energy spectrum ...
We study quasiperiodicity-induced localization of waves in strongly precompressed granular chains. W...
Energy bands of electrons in a square lattice potential threaded by a uniform magnetic field exhibit...
International audienceThe energy spectrum of a tight-binding Hamiltonian is studied for the two-dime...
We describe a continuous analog of the quasirectangular flat-top nonlinear modes earlier found for d...
We investigate theoretically the spectrum of a graphenelike sample (honeycomb lattice) subjected to ...
The properties of the Hofstadter butterfly, a fractal, self-similar spectrum of a two-dimensional el...
Abstract Hofstadter showed that the energy levels of electrons on a lattice plotted as a function of...
The 'Hofstadter butterfly', a plot of the spectrum of an electron in a two-dimensional periodic pote...
The system of a cold atomic gas in an optical lattice is governed by two factors: nonlinearity origi...
Recent advances in realizing artificial gauge fields on optical lattices promise experimental detect...
Abstract Localization of waves by disorder is a fundamental physical problem en-compassing a diverse...
We explore the possibility of multi-site breather states in a nonlinear Klein–Gordon lattice to beco...
Heterogeneity in lattice potentials (like random or quasiperiodic) can localize linear, non-interact...
We examine analytically and numerically the spectral properties of three quasi-one-dimensional latti...
Electrons moving through a spatially periodic lattice potential develop a quantized energy spectrum ...