Automorphic Equivalence within Gapped Phases of Quantum Lattice Systems

Bachmann, Sven; Michalakis, Spyridon; Nachtergaele, Bruno; Sims, Robert

doi:10.1007/s00220-011-1380-0

Cited by 161 publications

(334 citation statements)

References 54 publications

(60 reference statements)

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“…The quasi-adiabatic evolution defined in 3,4 simulates the true adiabatic evolution exactly, so long as the spectral gap is sufficiently large, which is the statement of Lemma III.4. But, first, let us look at some properties of the true adiabatic evolution.…”

Section: The Quasi-adiabatic Evolutionmentioning

confidence: 70%

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Quantization of Hall Conductance for Interacting Electrons on a Torus

Hastings

Michalakis

2014

Commun. Math. Phys.

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101

119

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We consider interacting, charged spins on a torus described by a gapped Hamiltonian with a unique groundstate and conserved local charge. Using quasi-adiabatic evolution of the groundstate around a flux-torus, we prove, without any averaging assumption, that the Hall conductance of the groundstate is quantized in integer multiples of e 2 /h, up to exponentially small corrections in the linear size L. In addition, we discuss extensions to the fractional quantization case under an additional topological order assumption on the degenerate groundstate subspace.

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Section: The Quasi-adiabatic Evolutionmentioning

confidence: 70%

“…1 as quasi-adiabatic evolution (and studied further in Ref. [2][3][4].) There are two crucial reasons for using the quasi-adiabatic evolution in its latest incarnation 3,4 :…”

Section: Sketch Of the Main Argumentmentioning

confidence: 99%

Quantization of Hall Conductance for Interacting Electrons on a Torus

Hastings

Michalakis

2014

Commun. Math. Phys.

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101

119

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“…Note that the above corollary combined with the quasiadiabatic continuation technique 23,27 implies stability of the ground-state subspace with respect to properties of local observables.…”

Section: Appendix A: Ltqo For Injective Mpsmentioning

confidence: 97%

Robustness in projected entangled pair states

et al. 2013

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We analyze a criterion which guarantees that the ground states of certain many-body systems are stable under perturbations. Specifically, we consider PEPS, which are believed to provide an efficient description, based on local tensors, for the low energy physics arising from local interactions. In order to assess stability in the framework of PEPS, one thus needs to understand how physically allowed perturbations of the local tensor affect the properties of the global state. In this paper, we show that a restricted version of the local topological quantum order (LTQO) condition [Michalakis and Pytel, Commun. Math. Phys. 322, 277 (2013)] provides a checkable criterion which allows us to assess the stability of local properties of PEPS under physical perturbations. We moreover show that LTQO itself is stable under perturbations which preserve the spectral gap, leading to nontrivial examples of PEPS which possess LTQO and are thus stable under arbitrary perturbations.

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“…Using the notion of automorphic equivalence, in 9 we showed how this definition can be made precise so that it can also be applied for infinite systems. In general, proving that the gap does not close is a hard problem but a criterion exists for frustration free models whose ground states are Matrix Product States (MPS) 10 .…”

mentioning

confidence: 99%

Product vacua with boundary states

Bachmann

Nachtergaele

2012

Phys. Rev. B

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We introduce a family of quantum spin chains with nearest-neighbor interactions that can serve to clarify and refine the classification of gapped quantum phases of such systems. The gapped ground states of these models can be described as a product vacuum with a finite number of particles bound to the edges. The numbers of particles, nL and nR, that can bind to the left and right edges of the finite chains serve as indices of the particular phase a model belongs to. All these ground states, which we call Product Vacua with Boundary States (PVBS) can be described as Matrix Product States (MPS). We present a curve of gapped Hamiltonians connecting the AKLT model to its representative PVBS model, which has indices nL = nR = 1. We also present examples with nL = nR = J, for any integer J ≥ 1, that are related a recently introduced class of SO(2J + 1)-invariant quantum spin chains.

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Automorphic Equivalence within Gapped Phases of Quantum Lattice Systems

Cited by 161 publications

References 54 publications

Quantization of Hall Conductance for Interacting Electrons on a Torus

Quantization of Hall Conductance for Interacting Electrons on a Torus

Robustness in projected entangled pair states

Product vacua with boundary states

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