Add to ORKGWe analytically study boundary conditions of the Dirac fermion models on a lattice, which describe the first and second order topological insulators. We obtain the dispersion relations of the edge and hinge states by solving these boundary conditions, and clarify that the Hamiltonian symmetry may provide a constraint on the boundary condition. We also demonstrate the edgehinge analog of the bulk-edge correspondence, in which the nontrivial topology of the gapped edge state ensures gaplessness of the hinge state.Comment: 29 pages, 2 figure
Topological modes (TMs) are usually localized at defects or boundaries of a much larger topological ...
The principle of bulk-edge correspondence for topological insulators was studied and later proven fo...
We calculate the ground state current densities for 2+1 dimensional free fermion theories with local...
International audienceWe analytically study boundary conditions of the Dirac fermion models on a lat...
We provide a systematic analysis of the boundary condition for the edge state, which is a ubiquitous...
We propose a relation between the $\eta$ invariant on a manifold with boundary, the $\eta$ invariant...
We present a novel theoretical approach to incorporate electronic interactions in the study of two-d...
Bound states at sharp corners have been widely viewed as the hallmark of two-dimensional second-orde...
The two-dimensional topological insulating phase has been experimentally discovered in HgTe quantum ...
We prove that that if the boundary of a topological insulator divides the plane in two regions conta...
The hallmark of topological phases of matter is the presence of robust boundary states. In this diss...
Journal ArticleWe prove a general theorem on the relation between the bulk topological quantum numbe...
In topological insulators, the bulk-boundary correspondence describes the relationship between the b...
We consider a dimer lattice of the Fermi-Pasta-Ulam-Tsingou (FPUT) type, where alternating linear co...
Dirac and Weyl semimetals both exhibit arc-like surface states. However, whereas the surface Fermi a...
Topological modes (TMs) are usually localized at defects or boundaries of a much larger topological ...
The principle of bulk-edge correspondence for topological insulators was studied and later proven fo...
We calculate the ground state current densities for 2+1 dimensional free fermion theories with local...
International audienceWe analytically study boundary conditions of the Dirac fermion models on a lat...
We provide a systematic analysis of the boundary condition for the edge state, which is a ubiquitous...
We propose a relation between the $\eta$ invariant on a manifold with boundary, the $\eta$ invariant...
We present a novel theoretical approach to incorporate electronic interactions in the study of two-d...
Bound states at sharp corners have been widely viewed as the hallmark of two-dimensional second-orde...
The two-dimensional topological insulating phase has been experimentally discovered in HgTe quantum ...
We prove that that if the boundary of a topological insulator divides the plane in two regions conta...
The hallmark of topological phases of matter is the presence of robust boundary states. In this diss...
Journal ArticleWe prove a general theorem on the relation between the bulk topological quantum numbe...
In topological insulators, the bulk-boundary correspondence describes the relationship between the b...
We consider a dimer lattice of the Fermi-Pasta-Ulam-Tsingou (FPUT) type, where alternating linear co...
Dirac and Weyl semimetals both exhibit arc-like surface states. However, whereas the surface Fermi a...
Topological modes (TMs) are usually localized at defects or boundaries of a much larger topological ...
The principle of bulk-edge correspondence for topological insulators was studied and later proven fo...
We calculate the ground state current densities for 2+1 dimensional free fermion theories with local...