Add to ORKGAbstract. We discuss the role of compact symmetry groups, G, in the classification of gapped ground state phases of quantum spin systems. We consider two representations of G on infinite subsystems. First, in arbitrary dimensions, we show that the ground state spaces of models within the same G-symmetric phase carry equivalent representations of the group for each finite or infinite sublattice on which they can be defined and on which they remain gapped. This includes infinite systems with boundaries or with non-trivial topologies. Second, for two classes of one-dimensional models, by two different methods, for G = SU(2) in one, and G ⊂ SU(d), in the other we construct explicitly an ‘excess spin ’ operator that implements rotations of half ...
We undertake a systematic study of symmetry-protected topological gapped phases of quantum spin chai...
We study the stability with respect to a broad class of perturbations of gapped ground-state phases ...
In this short note, I review some recent results about gapped ground state phases of quantu...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground s...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground s...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground state phas...
We address the question of the classification of gapped ground states in one dimension that...
We address the question of the classification of gapped ground states in one dimension that...
Abstract. We address the question of the classification of gapped ground states in one dimension tha...
Quantum many-body systems divide into a variety of phases with very different physical properties. T...
We introduce a family of quantum spin chains with nearest-neighbor interactions that can se...
Quantum phases with different orders exist with or without breaking the symmetry of the system. Rece...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We study different quantum phases in integer spin systems with on-site D[subscript 2h]=D[subscript 2...
We undertake a systematic study of symmetry-protected topological gapped phases of quantum spin chai...
We study the stability with respect to a broad class of perturbations of gapped ground-state phases ...
In this short note, I review some recent results about gapped ground state phases of quantu...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground s...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground s...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground state phas...
We address the question of the classification of gapped ground states in one dimension that...
We address the question of the classification of gapped ground states in one dimension that...
Abstract. We address the question of the classification of gapped ground states in one dimension tha...
Quantum many-body systems divide into a variety of phases with very different physical properties. T...
We introduce a family of quantum spin chains with nearest-neighbor interactions that can se...
Quantum phases with different orders exist with or without breaking the symmetry of the system. Rece...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We study different quantum phases in integer spin systems with on-site D[subscript 2h]=D[subscript 2...
We undertake a systematic study of symmetry-protected topological gapped phases of quantum spin chai...
We study the stability with respect to a broad class of perturbations of gapped ground-state phases ...
In this short note, I review some recent results about gapped ground state phases of quantu...