Add to ORKGWe introduce a time-reversal-symmetric analog of the Hopf insulator that we call a spin Hopf insulator. The spin Hopf insulator harbors nontrivial Kane-Mele $\Z_2$ invariants on its surfaces, and is the first example of a nonmagnetic delicate topological insulator with spin-orbit coupling. We show that the Kane-Mele $\Z_2$ topology on the surface is generically unstable, but can be stabilized by the addition of a composition of the particle hole and spatial inversion symmetry. Such a symmetry not only protects the surface $\Z_2$ invariant, but also protects gapless helical hinge states on the spin Hopf insulator. Furthermore, we show that in the presence of four-fold rotational symmetry, the spin Hopf insulator exhibits a returning Thouless...
That disorder can induce nontrivial topology is a surprising discovery in topological physics. As a ...
Three-dimensional topological (crystalline) insulators are materials with an insulating bulk but con...
The quantum nature of electron spin is crucial for establishing topological invariants in real mater...
Pontrjagin's seminal topological classification of two-band Hamiltonians in three momentum dimension...
Pontrjagin's seminal topological classification of two-band Hamiltonians in three momentum dimension...
Most topological insulators discovered today in spinful systems can be transformed from topological ...
Topological insulating (TI) phases were originally highlighted for their disorder-robust bulk respon...
The Hopf insulator is a weak topological insulator characterized by an insulating bulk with conducti...
We construct two-band topological semimetals in four dimensions using the unstable homotopy of maps ...
An antiferromagnetic Chern insulator (AFCI) can exist if the effect of the time-reversal transformat...
We derive a $\mathbb{Z}_4$ topological invariant that extends beyond symmetry eigenvalues and Wilson...
Topological insulators are one of the most thoroughly investigated systems in condensed matter physi...
Solitonic symmetry has been believed to follow the homotopy-group classification of topological soli...
The paradigm of topological insulators asserts that an energy gap separates conduction and valence b...
Three-dimensional topological (crystalline) insulators are materials with an insulating bulk but con...
That disorder can induce nontrivial topology is a surprising discovery in topological physics. As a ...
Three-dimensional topological (crystalline) insulators are materials with an insulating bulk but con...
The quantum nature of electron spin is crucial for establishing topological invariants in real mater...
Pontrjagin's seminal topological classification of two-band Hamiltonians in three momentum dimension...
Pontrjagin's seminal topological classification of two-band Hamiltonians in three momentum dimension...
Most topological insulators discovered today in spinful systems can be transformed from topological ...
Topological insulating (TI) phases were originally highlighted for their disorder-robust bulk respon...
The Hopf insulator is a weak topological insulator characterized by an insulating bulk with conducti...
We construct two-band topological semimetals in four dimensions using the unstable homotopy of maps ...
An antiferromagnetic Chern insulator (AFCI) can exist if the effect of the time-reversal transformat...
We derive a $\mathbb{Z}_4$ topological invariant that extends beyond symmetry eigenvalues and Wilson...
Topological insulators are one of the most thoroughly investigated systems in condensed matter physi...
Solitonic symmetry has been believed to follow the homotopy-group classification of topological soli...
The paradigm of topological insulators asserts that an energy gap separates conduction and valence b...
Three-dimensional topological (crystalline) insulators are materials with an insulating bulk but con...
That disorder can induce nontrivial topology is a surprising discovery in topological physics. As a ...
Three-dimensional topological (crystalline) insulators are materials with an insulating bulk but con...
The quantum nature of electron spin is crucial for establishing topological invariants in real mater...