The presence of a topologically non-trivial discrete invariant implies the existence of gapless modes in finite samples, but it does not necessarily imply their localization. The disappearance of the indirect energy gap in the bulk generically leads to the absence of localized edge states. We illustrate this behavior in two fundamental lattice models on the single-particle level. By tuning a hopping parameter the indirect gap is closed while maintaining the topological properties. The inverse participation ratio is used to measure the degree of localization
Topologically nontrivial phases are linked to the appearance of localized modes in the boundaries of...
We show that topology can protect exponentially localized, zero energy edge modes at critical points...
Capital to topological insulators, the bulk-boundary correspondence ties a topological invariant com...
Spin chains with symmetry-protected edge zero modes can be seen as prototypical systems for explorin...
© 2016 American Physical Society. Localization transitions as a function of temperature require a ma...
We study edge states in graphene systems where a bulk energy gap is opened by inversion symmetry bre...
The Hofstadter model is a simple yet powerful Hamiltonian to study quantum Hall physics in a lattice...
30 pages, 2 figures; v2: Fixed formatting issues, bibliography and acknowledgementsInternational aud...
Topological systems with their robust features are of interest in different fields including electro...
We study the topological edge states of the Haldane model with zigzag/armchair lattice edges. The Ha...
We use the method of bulk-boundary correspondence of topological invariants to show that disordered ...
The boundary states of topological insulators are thought not to depend on the precise atomic struct...
We theoretically investigate and experimentally demonstrate the existence of topological edge states...
We prove a general theorem on the relation between the bulk topological quantum number and the edge ...
Non-Hermitian lattices under semi-infinite boundary conditions sustain an extensive number of expone...
Topologically nontrivial phases are linked to the appearance of localized modes in the boundaries of...
We show that topology can protect exponentially localized, zero energy edge modes at critical points...
Capital to topological insulators, the bulk-boundary correspondence ties a topological invariant com...
Spin chains with symmetry-protected edge zero modes can be seen as prototypical systems for explorin...
© 2016 American Physical Society. Localization transitions as a function of temperature require a ma...
We study edge states in graphene systems where a bulk energy gap is opened by inversion symmetry bre...
The Hofstadter model is a simple yet powerful Hamiltonian to study quantum Hall physics in a lattice...
30 pages, 2 figures; v2: Fixed formatting issues, bibliography and acknowledgementsInternational aud...
Topological systems with their robust features are of interest in different fields including electro...
We study the topological edge states of the Haldane model with zigzag/armchair lattice edges. The Ha...
We use the method of bulk-boundary correspondence of topological invariants to show that disordered ...
The boundary states of topological insulators are thought not to depend on the precise atomic struct...
We theoretically investigate and experimentally demonstrate the existence of topological edge states...
We prove a general theorem on the relation between the bulk topological quantum number and the edge ...
Non-Hermitian lattices under semi-infinite boundary conditions sustain an extensive number of expone...
Topologically nontrivial phases are linked to the appearance of localized modes in the boundaries of...
We show that topology can protect exponentially localized, zero energy edge modes at critical points...
Capital to topological insulators, the bulk-boundary correspondence ties a topological invariant com...