Add to ORKGWe explain the coarse geometric origin of the fact that certain spectral subspaces of topological insulator Hamiltonians are delocalized, in the sense that they cannot admit an orthonormal basis of localized wavefunctions, with respect to any uniformly discrete set of localization centers. This is a robust result requiring neither spatial homogeneity nor symmetries, and applies to Landau levels of disordered quantum Hall systems on general Riemannian manifolds.Comment: 12 pages, Minor improvements mad
Some interesting physical systems have all their wavefunctions localized in small subsystems. One wa...
We investigate the possibility of many-body localization in translation-invariant Hamiltonian system...
Many-body-localized (MBL) phases can be topologically distinct, but distinguishing these phases usin...
On a flat surface, the Landau operator, or quantum Hall Hamiltonian, has spectrum a discrete set of ...
Disorder-free localization is a novel mechanism for ergodicity breaking which can occur in interacti...
We study theoretically transitions between the localized and chaotic many-body regimes in one-dimens...
Motivated by recent developments in quantum simulation of synthetic dimensions, e.g. in optical latt...
Some recent developments in topological quantum field theory have focused on localization techniques...
Some recent developments in topological quantum field theory have focused on localization techniques...
Topological insulators are usually studied in physics under the assumption of translation invariance...
The topological properties of electronic band structures are closely related to the degree of locali...
We study generalizations of the Berry phase for quantum lattice systems in arbitrary dimensions. For...
Anderson localization is the ubiquitous phenomenon of inhibition of transport of classical and quant...
As realized by TKNN in 1982, a relevant Transport-Topology Correspondence holds true for gapped per...
A longstanding question in quantum gravity regards the localization of quantum information; one way ...
Some interesting physical systems have all their wavefunctions localized in small subsystems. One wa...
We investigate the possibility of many-body localization in translation-invariant Hamiltonian system...
Many-body-localized (MBL) phases can be topologically distinct, but distinguishing these phases usin...
On a flat surface, the Landau operator, or quantum Hall Hamiltonian, has spectrum a discrete set of ...
Disorder-free localization is a novel mechanism for ergodicity breaking which can occur in interacti...
We study theoretically transitions between the localized and chaotic many-body regimes in one-dimens...
Motivated by recent developments in quantum simulation of synthetic dimensions, e.g. in optical latt...
Some recent developments in topological quantum field theory have focused on localization techniques...
Some recent developments in topological quantum field theory have focused on localization techniques...
Topological insulators are usually studied in physics under the assumption of translation invariance...
The topological properties of electronic band structures are closely related to the degree of locali...
We study generalizations of the Berry phase for quantum lattice systems in arbitrary dimensions. For...
Anderson localization is the ubiquitous phenomenon of inhibition of transport of classical and quant...
As realized by TKNN in 1982, a relevant Transport-Topology Correspondence holds true for gapped per...
A longstanding question in quantum gravity regards the localization of quantum information; one way ...
Some interesting physical systems have all their wavefunctions localized in small subsystems. One wa...
We investigate the possibility of many-body localization in translation-invariant Hamiltonian system...
Many-body-localized (MBL) phases can be topologically distinct, but distinguishing these phases usin...