The spectral approach to infinite disordered crystals is applied to anAnderson-type Hamiltonian to demonstrate the existence of extended states for nonzero disorder in 2D lattices of different geometries. The numerical simulations shown prove that extended states exist for disordered honeycomb, triangular, and square crystals. This observation stands in contrast to the predictions of scaling theory, and aligns with experiments in photonic lattices and electron systems. The method used is the only theoretical approach aimed at showing delocalization. A comparison of the results for the three geometries indicates that the triangular and honeycomb lattices experience transition in the transport behavior for similar levels of disorder, which is...
We consider a tight-binding model on the regular honeycomb lattice with uncorrelated on-site disorde...
We estimate the transmittance of the quantum percolation model of Eggarter and Kirkpatrick on square...
We study the localization properties of a disordered tight-binding Hamiltonian on a generic bipartit...
This paper introduces the spectral approach to transport problems in infinite disordered systems cha...
The transport properties of a disordered two-dimensional (2D) honeycomb lattice are examined numeric...
A cubic lattice with random parameters is reduced to a linear chain by the means of the projection t...
In this paper we introduce the spectral approach to delocalization in infinite disordered systems an...
Localization appears in a variety of phenomena indisordered systems, including a complete halt of el...
Quantum percolation is one of several disorder-only models that address the question of whether cond...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
We study quantum percolation which is described by a tight-binding Hamiltonian containing only off-d...
Restricted AccessWe report results of our numerical calculations, based on the equation of motion me...
We present analytically exact results to show that certain quasi–one-dimensional lattices, where the...
Uncorrelated disorder in generalized 3D Lieb models gives rise to the existence of bounded mobility ...
We estimate the transmittance of the quantum percolation model of Eggarter and Kirkpatrick (1972) on...
We consider a tight-binding model on the regular honeycomb lattice with uncorrelated on-site disorde...
We estimate the transmittance of the quantum percolation model of Eggarter and Kirkpatrick on square...
We study the localization properties of a disordered tight-binding Hamiltonian on a generic bipartit...
This paper introduces the spectral approach to transport problems in infinite disordered systems cha...
The transport properties of a disordered two-dimensional (2D) honeycomb lattice are examined numeric...
A cubic lattice with random parameters is reduced to a linear chain by the means of the projection t...
In this paper we introduce the spectral approach to delocalization in infinite disordered systems an...
Localization appears in a variety of phenomena indisordered systems, including a complete halt of el...
Quantum percolation is one of several disorder-only models that address the question of whether cond...
International audienceLocalization of electronic wave functions in modern two-dimensional (2D) mater...
We study quantum percolation which is described by a tight-binding Hamiltonian containing only off-d...
Restricted AccessWe report results of our numerical calculations, based on the equation of motion me...
We present analytically exact results to show that certain quasi–one-dimensional lattices, where the...
Uncorrelated disorder in generalized 3D Lieb models gives rise to the existence of bounded mobility ...
We estimate the transmittance of the quantum percolation model of Eggarter and Kirkpatrick (1972) on...
We consider a tight-binding model on the regular honeycomb lattice with uncorrelated on-site disorde...
We estimate the transmittance of the quantum percolation model of Eggarter and Kirkpatrick on square...
We study the localization properties of a disordered tight-binding Hamiltonian on a generic bipartit...