Rigorous RG Algorithms and Area Laws for Low Energy Eigenstates in 1D

Arad, Itai; Landau, Zeph; Vazirani, Umesh; Vidick, Thomas

doi:10.1007/s00220-017-2973-z

Cited by 81 publications

(148 citation statements)

References 35 publications

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“…If we consider the case of local and gapped Hamiltonians, it has been shown that the relevant ground states cannot be highly entangled [19,[37][38][39][40] (see [41] for a review). This restricted entanglement means that such states admit efficient MPS approximations [17], and moreover that they may be efficiently approximated [40,[42][43][44][45], showing that the presence of the gap causes the complexity to plummet from QMA-complete all the way down to P, removing the complexity barrier to simulation. We note that despite the challenges, both complexity theoretic and physical, in applying MPS to gapless models, they have been successfully utilised for this purpose [46][47][48].…”

Section: Tensor Network Algorithmsmentioning

confidence: 99%

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Hand-waving and interpretive dance: an introductory course on tensor networks

Bridgeman

Chubb

2017

J. Phys. A: Math. Theor.

321

300

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View the article online for updates and enhancements. AbstractThe curse of dimensionality associated with the Hilbert space of spin systems provides a significant obstruction to the study of condensed matter systems. Tensor networks have proven an important tool in attempting to overcome this difficulty in both the numerical and analytic regimes.These notes form the basis for a seven lecture course, introducing the basics of a range of common tensor networks and algorithms. In particular, we cover: introductory tensor network notation, applications to quantum information, basic properties of matrix product states, a classification of quantum phases using tensor networks, algorithms for finding matrix product states, basic properties of projected entangled pair states, and multiscale entanglement renormalisation ansatz states.The lectures are intended to be generally accessible, although the relevance of many of the examples may be lost on students without a background in many-body physics/quantum information. For each lecture, several problems are given, with worked solutions in an ancillary file.

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Section: Tensor Network Algorithmsmentioning

confidence: 99%

“…2. It is known that the local hamiltonian problem is in P for 1D gapped Hamiltonians [40,[42][43][44][45]. DMRG and TEBD are the most common techniques for numerically finding the ground states of such systems.…”

Section: Consider the Critical Transverse Ising Modelmentioning

confidence: 99%

Hand-waving and interpretive dance: an introductory course on tensor networks

Bridgeman

Chubb

2017

J. Phys. A: Math. Theor.

321

300

View full text Add to dashboard Cite

show abstract

“…For more examples, see refs. [3][4][5][6][7]12] A periodic-boundary-condition MPS state is just like the righthand side of Equation (26), which consists of many local rank-3 tensors. For the open boundary case, the boundary local tensor is replaced with rank-2 tensors, and the inner part remains the same.…”

Section: Tensor Network Statesmentioning

confidence: 99%

“…Although the dimension of the Hilbert space of the system grows exponentially with the number of particles in general, fortunately, physical states frequently have some internal structures, for example, obeying the entanglement area law, making it easier to solve problems than in the general case. [3][4][5][6][7] Physical properties of the system usually restrict the form of the ground state, for example, area-law states, [8] ground states of local gapped systems. [9] Therefore, many-body localized systems can be efficiently represented by a tensor network, [3,[10][11][12] which is a new tool developed in recent years to attack difficulties in representing quantum many-body states efficiently.…”

Section: Introductionmentioning

confidence: 99%

Quantum Neural Network States: A Brief Review of Methods and Applications

et al. 2019

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One of the main challenges of quantum many‐body physics is the exponential growth in the dimensionality of the Hilbert space with system size. This growth makes solving the Schrödinger equation of the system extremely difficult. Nonetheless, many physical systems have a simplified internal structure that typically makes the parameters needed to characterize their ground states exponentially smaller. Many numerical methods then become available to capture the physics of the system. Among modern numerical techniques, neural networks, which show great power in approximating functions and extracting features of big data, are now attracting much interest. In this work, the progress in using artificial neural networks to build quantum many‐body states is reviewed. The Boltzmann machine representation is taken as a prototypical example to illustrate various aspects of the neural network states. The classical neural networks are also briefly reviewed, and it is illustrated how to use neural networks to represent quantum states and density operators. Some physical properties of the neural network states are discussed. For applications, the progress in many‐body calculations based on neural network states, the neural network state approach to tomography, and the classical simulation of quantum computing based on Boltzmann machine states are briefly reviewed.

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“…Together with the detectability lemma, the two results establish a form of duality between H and DL(H ), showing that their spectral gaps are always within a constant factor from each other. This converse to the DL has already been used for the purpose of proving lower bounds on the spectral gap of frustration-free Hamiltonians in forthcoming work on 1D area laws and efficient algorithms [25].…”

Section: Published By the American Physical Society Under The Terms Omentioning

confidence: 99%

Simple proof of the detectability lemma and spectral gap amplification

2016

Self Cite

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The detectability lemma is a useful tool for probing the structure of gapped ground states of frustration-free Hamiltonians of lattice spin models. The lemma provides an estimate on the error incurred by approximating the ground space projector with a product of local projectors. We provide a simpler proof for the detectability lemma which applies to an arbitrary ordering of the local projectors, and show that it is tight up to a constant factor. As an application, we show how the lemma can be combined with a strong converse by Gao to obtain local spectral gap amplification: We show that by coarse graining a local frustration-free Hamiltonian with a spectral gap γ > 0 to a length scale O(γ −1/2 ), one gets a Hamiltonian with an (1) spectral gap.

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Rigorous RG Algorithms and Area Laws for Low Energy Eigenstates in 1D

Cited by 81 publications

References 35 publications

Hand-waving and interpretive dance: an introductory course on tensor networks

Hand-waving and interpretive dance: an introductory course on tensor networks

Quantum Neural Network States: A Brief Review of Methods and Applications

Simple proof of the detectability lemma and spectral gap amplification

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