We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typical examples, $V$ is a large, but finite subset of Z^d. For finite range Hamiltonians with uniformly bounded interaction terms and a unique, gapped ground state, we demonstrate a locality property of the corresponding ground state projector. In such systems, this ground state projector can be approximated by the product of observables with quantifiable supports. In fact, given any subset, X, of V the ground state projector can be approximated by the product of two projections, one supported on X and one supported on X^c, and a bounded observable supported on a boundary region in such a way...
The local Hamiltonian problem consists of estimating the ground-state energy (given by the minimum e...
For a large class of finite-range quantum spin models with half-integer spins, we prove tha...
We present a simple quantum many-body system - a two-dimensional lattice of qubits with a Hamiltonia...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We study the stability with respect to a broad class of perturbations of gapped ground-state phases ...
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 begin by deriving bounds for the entanglement of a spin with an (adjacent and non-adjacent) inter...
Abstract. We discuss the role of compact symmetry groups, G, in the classification of gapped ground ...
We introduce a family of quantum spin chains with nearest-neighbor interactions that can se...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground state phas...
Abstract. We address the question of the classification of gapped ground states in one dimension tha...
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...
An important aspect of quantum simulation is the preparation of physically interesting states on a q...
The local Hamiltonian problem consists of estimating the ground-state energy (given by the minimum e...
For a large class of finite-range quantum spin models with half-integer spins, we prove tha...
We present a simple quantum many-body system - a two-dimensional lattice of qubits with a Hamiltonia...
We consider quantum spin systems defined on finite sets $V$ equipped with a metric. In typi...
We study the stability with respect to a broad class of perturbations of gapped ground-state phases ...
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 begin by deriving bounds for the entanglement of a spin with an (adjacent and non-adjacent) inter...
Abstract. We discuss the role of compact symmetry groups, G, in the classification of gapped ground ...
We introduce a family of quantum spin chains with nearest-neighbor interactions that can se...
We discuss the role of compact symmetry groups, G, in the classification of gapped ground state phas...
Abstract. We address the question of the classification of gapped ground states in one dimension tha...
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...
An important aspect of quantum simulation is the preparation of physically interesting states on a q...
The local Hamiltonian problem consists of estimating the ground-state energy (given by the minimum e...
For a large class of finite-range quantum spin models with half-integer spins, we prove tha...
We present a simple quantum many-body system - a two-dimensional lattice of qubits with a Hamiltonia...
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