Add to ORKGIn the presence of crystalline symmetries, topological phases of matter acquire a host of invariants leading to non-trivial quantized responses. Here we study a particular invariant, the discrete shift $\mathscr{S}$, for the square lattice Hofstadter model of free fermions. $\mathscr{S}$ is associated with a $\mathbb{Z}_M$ classification in the presence of $M$-fold rotational symmetry and charge conservation. $\mathscr{S}$ gives quantized contributions to (i) the fractional charge bound to a lattice disclination, and (ii) the angular momentum of the ground state with an additional, symmetrically inserted magnetic flux. $\mathscr{S}$ forms its own `Hofstadter butterfly', which we numerically compute, refining the usual phase diagram of the H...
While free fermion topological crystalline insulators have been largely classified, the analogous pr...
In a lattice model subject to a perpendicular magnetic field, when the lattice constant is comparabl...
We construct a non-trivial $U(1)/\mathbb{Z}_q$ principal bundle on~$T^4$ from the compact $U(1)$ lat...
Fractional Chern insulators (FCIs) are strongly correlated, topological phases of matter that may ex...
We show how to define a quantized many-body charge polarization [over →] for (2+1)D topological phas...
Fractional Chern insulators (FCIs) are strongly correlated, topological phases of matter that may ex...
The bulk-boundary correspondence relates quantized edge states to bulk topological invariants in top...
Recent advances in realizing artificial gauge fields on optical lattices promise experimental detect...
The two-dimensional Schwinger model is used to explore how lattice fermion operators perceive the gl...
Square-root topology describes models whose topological properties can be revealed upon squaring the...
We show that all the bands of the Hofstadter model on the torus have an exactly flat dispersion and ...
We investigate the rich quantum phase diagram of Wegner's theory of discrete Ising gauge fields inte...
Topologically non-trivial Hamiltonians with periodic boundary conditions are characterized by strict...
The Harper-Hofstadter model provides a fractal spectrum containing topological bands of any integer ...
Adding magnetic flux to a band structure breaks Bloch's theorem by realizing a projective representa...
While free fermion topological crystalline insulators have been largely classified, the analogous pr...
In a lattice model subject to a perpendicular magnetic field, when the lattice constant is comparabl...
We construct a non-trivial $U(1)/\mathbb{Z}_q$ principal bundle on~$T^4$ from the compact $U(1)$ lat...
Fractional Chern insulators (FCIs) are strongly correlated, topological phases of matter that may ex...
We show how to define a quantized many-body charge polarization [over →] for (2+1)D topological phas...
Fractional Chern insulators (FCIs) are strongly correlated, topological phases of matter that may ex...
The bulk-boundary correspondence relates quantized edge states to bulk topological invariants in top...
Recent advances in realizing artificial gauge fields on optical lattices promise experimental detect...
The two-dimensional Schwinger model is used to explore how lattice fermion operators perceive the gl...
Square-root topology describes models whose topological properties can be revealed upon squaring the...
We show that all the bands of the Hofstadter model on the torus have an exactly flat dispersion and ...
We investigate the rich quantum phase diagram of Wegner's theory of discrete Ising gauge fields inte...
Topologically non-trivial Hamiltonians with periodic boundary conditions are characterized by strict...
The Harper-Hofstadter model provides a fractal spectrum containing topological bands of any integer ...
Adding magnetic flux to a band structure breaks Bloch's theorem by realizing a projective representa...
While free fermion topological crystalline insulators have been largely classified, the analogous pr...
In a lattice model subject to a perpendicular magnetic field, when the lattice constant is comparabl...
We construct a non-trivial $U(1)/\mathbb{Z}_q$ principal bundle on~$T^4$ from the compact $U(1)$ lat...