Add to ORKGThe Kapustin-Fidkowski no-go theorem forbids $U(1)$ symmetric topological orders with non-trivial Hall conductivity in (2+1)d from admitting commuting projector Hamiltonians, where the latter is the paradigmatic method to construct exactly solvable lattice models for topological orders. Even if a topological order would intrinsically have admitted commuting projector Hamiltonians, the theorem forbids so once its interplay with $U(1)$ global symmetry which generates Hall conductivity is taken into consideration. Nonetheless, in this work, we show that for all (2+1)d $U(1)$ symmetric abelian topological orders of such kind, we can construct a lattice Hamiltonian that is controllably solvable at low energies, even though not "exactly" solvable...
The interplay among symmetry, topology and condensed matter systems has deepened our understandings ...
Topological orders have been intrinsically identified in a class of systems such as fractional quant...
The fractional quantum Hall (FQH) effect illustrates the range of novel phenomena which can arise in...
The discrete Hamiltonian of Su, Schrieffer and Heeger (SSH) is a well-known one-dimensional translat...
We investigate symmetry-preserving gapped boundary of (2+1)D topological phases with global symmetry...
We prove that neither Integer nor Fractional Quantum Hall Effects with nonzero Hall conductivity are...
The interplay between interactions and topology in quantum materials is of extensive current interes...
In this thesis, we study the topological phases of quantum spin systems. One project is to investiga...
We consider fixed-point models for topological phases of matter formulated as discrete path integral...
We propose a minimal interacting lattice model for two-dimensional class-D higher-order topological ...
Three-dimensional (3d) gapped topological phases with fractional excitations are divided into two su...
The interplay among symmetry, topology and condensed matter systems has deepened our understandings ...
We show how the phases of interacting particles in topological flat bands, known as fractional Chern...
In non-interacting systems, bands from non-trivial topology emerge strictly at half-filling and exhi...
While free fermion topological crystalline insulators have been largely classified, the analogous pr...
The interplay among symmetry, topology and condensed matter systems has deepened our understandings ...
Topological orders have been intrinsically identified in a class of systems such as fractional quant...
The fractional quantum Hall (FQH) effect illustrates the range of novel phenomena which can arise in...
The discrete Hamiltonian of Su, Schrieffer and Heeger (SSH) is a well-known one-dimensional translat...
We investigate symmetry-preserving gapped boundary of (2+1)D topological phases with global symmetry...
We prove that neither Integer nor Fractional Quantum Hall Effects with nonzero Hall conductivity are...
The interplay between interactions and topology in quantum materials is of extensive current interes...
In this thesis, we study the topological phases of quantum spin systems. One project is to investiga...
We consider fixed-point models for topological phases of matter formulated as discrete path integral...
We propose a minimal interacting lattice model for two-dimensional class-D higher-order topological ...
Three-dimensional (3d) gapped topological phases with fractional excitations are divided into two su...
The interplay among symmetry, topology and condensed matter systems has deepened our understandings ...
We show how the phases of interacting particles in topological flat bands, known as fractional Chern...
In non-interacting systems, bands from non-trivial topology emerge strictly at half-filling and exhi...
While free fermion topological crystalline insulators have been largely classified, the analogous pr...
The interplay among symmetry, topology and condensed matter systems has deepened our understandings ...
Topological orders have been intrinsically identified in a class of systems such as fractional quant...
The fractional quantum Hall (FQH) effect illustrates the range of novel phenomena which can arise in...