Add to ORKGExact results are obtained on the localization of eigenstates in one-dimensional infinite disordered systems with diagonal and off-diagonal randomness. A Furstenberg-type theorem is established for the product of matrices associated with a multi-Markov-chain. As a result, Matsuda and Ishii's theory is generalized to examine the systems with both randomnesses. Harmonic chains, tightly binding electronic systems and Heisenberg-Mattis model are considered as typical examples
Abstract. A brief review is given of the current understanding of the electronic structure, transpor...
We discuss new results on the geometry of eigenfunctions in disordered systems. More precisely, we s...
Many-body eigenstates beyond the Gaussian approximation can be constructed in terms of local integra...
Problem of localization of eigenstates is examined for one-dimensional infinite disordered systems w...
By solving integral equations, approximate stationary probability densities of some random variables...
The degree of electronic localization in disordered one-dimensional systems is discussed. The model ...
Using exact diagonalization technique, we investigate the many-body localization phenomenon in the 1...
We investigate the issue of eigenfunction localization in random fractal lattices embedded in a two-...
We study statistical properties of the eigenfunctions in the three-dimensional Anderson model of loc...
Nous étudions une généralisation du modèle de liaison serrée d'Anderson pour les réseaux désordonnés...
It is shown how the weak disorder expansion of the Liapunov exponents of a product of random matrice...
Using exact numerical diagonalization, we investigate localization in two classes of rando...
We analyze the spectral distribution of localisation in a 1D diagonally disordered chain of fragment...
International audienceSeveral examples of disordered one dimensional models are discussed : a spin g...
We generalize the recently introduced Density-Matrix Renormalization Group (DMRG-X) [Khemani et al, ...
Abstract. A brief review is given of the current understanding of the electronic structure, transpor...
We discuss new results on the geometry of eigenfunctions in disordered systems. More precisely, we s...
Many-body eigenstates beyond the Gaussian approximation can be constructed in terms of local integra...
Problem of localization of eigenstates is examined for one-dimensional infinite disordered systems w...
By solving integral equations, approximate stationary probability densities of some random variables...
The degree of electronic localization in disordered one-dimensional systems is discussed. The model ...
Using exact diagonalization technique, we investigate the many-body localization phenomenon in the 1...
We investigate the issue of eigenfunction localization in random fractal lattices embedded in a two-...
We study statistical properties of the eigenfunctions in the three-dimensional Anderson model of loc...
Nous étudions une généralisation du modèle de liaison serrée d'Anderson pour les réseaux désordonnés...
It is shown how the weak disorder expansion of the Liapunov exponents of a product of random matrice...
Using exact numerical diagonalization, we investigate localization in two classes of rando...
We analyze the spectral distribution of localisation in a 1D diagonally disordered chain of fragment...
International audienceSeveral examples of disordered one dimensional models are discussed : a spin g...
We generalize the recently introduced Density-Matrix Renormalization Group (DMRG-X) [Khemani et al, ...
Abstract. A brief review is given of the current understanding of the electronic structure, transpor...
We discuss new results on the geometry of eigenfunctions in disordered systems. More precisely, we s...
Many-body eigenstates beyond the Gaussian approximation can be constructed in terms of local integra...