The localization properties of the wave functions of vibrations in two-dimensional (2D) crystals are studied numerically for square and hexagonal lattices within the framework of an algebraic model. The wave functions of 2D lattices have remarkable localization properties, especially at the van Hove singularities (vHs). Finite-size sheets with a hexagonal lattice (graphene-like materials), in addition, exhibit at zero energy a localization of the wave functions at zigzag edges, so-called edge states. The striped structure of the wave functions at a vHs is particularly noteworthy. We have investigated its stability and that of the edge states with respect to perturbations in the lattice structure, and the effect of the boundary shape on the ...
One of the main features of topological phases is the presence of robust boundary states that are pr...
We study the existence and stability of localized states in the discrete nonlinear Schrödinger equat...
We investigate analytically and numerically the existence and dynamical stability of different local...
The localization properties of the wave functions of vibrations in two-dimensional (2D) crystals are...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
This review paper outlines several formulations for lattice structures where dynamic lattice Green's...
Perturbations in the homogeneity of a crystal can give rise to localized modes of vibration. We have...
For square and triangular lattices we have found a new line-localized primitive waveform (LPW) exist...
The spectral approach to infinite disordered crystals is applied to anAnderson-type Hamiltonian to d...
The localized modes of vibrations are dicussed for the planes (001), (011), and (111) of impurity at...
Restricted AccessWe report results of our numerical calculations, based on the equation of motion me...
An asymptotic scheme is generated that captures the motion of waves within discrete hexagonal and ho...
We investigate energy localization and transport in the form of discrete breathers and their movabil...
We study the problem of constructing bulk and surface embedded modes (EMs) inside the quasi-continuu...
The simplest non-trivial model of a two-dimensional monatomic lattice-one with nearest neighbour cen...
One of the main features of topological phases is the presence of robust boundary states that are pr...
We study the existence and stability of localized states in the discrete nonlinear Schrödinger equat...
We investigate analytically and numerically the existence and dynamical stability of different local...
The localization properties of the wave functions of vibrations in two-dimensional (2D) crystals are...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
This review paper outlines several formulations for lattice structures where dynamic lattice Green's...
Perturbations in the homogeneity of a crystal can give rise to localized modes of vibration. We have...
For square and triangular lattices we have found a new line-localized primitive waveform (LPW) exist...
The spectral approach to infinite disordered crystals is applied to anAnderson-type Hamiltonian to d...
The localized modes of vibrations are dicussed for the planes (001), (011), and (111) of impurity at...
Restricted AccessWe report results of our numerical calculations, based on the equation of motion me...
An asymptotic scheme is generated that captures the motion of waves within discrete hexagonal and ho...
We investigate energy localization and transport in the form of discrete breathers and their movabil...
We study the problem of constructing bulk and surface embedded modes (EMs) inside the quasi-continuu...
The simplest non-trivial model of a two-dimensional monatomic lattice-one with nearest neighbour cen...
One of the main features of topological phases is the presence of robust boundary states that are pr...
We study the existence and stability of localized states in the discrete nonlinear Schrödinger equat...
We investigate analytically and numerically the existence and dynamical stability of different local...