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相关论文: Algorithms for entanglement renormalization

200 篇论文

In a recent contribution [arXiv:0904:4151] entanglement renormalization was generalized to fermionic lattice systems in two spatial dimensions. Entanglement renormalization is a real-space coarse-graining transformation for lattice systems…

强关联电子 · 物理学 2015-05-13 Philippe Corboz , Guifre Vidal

We introduce the multi-scale entanglement renormalization ansatz (MERA), an efficient representation of certain quantum many-body states on a D-dimensional lattice. Equivalent to a quantum circuit with logarithmic depth and distinctive…

量子物理 · 物理学 2009-11-13 G. Vidal

We propose a symmetric version of the multi-scale entanglement renormalization Ansatz (MERA) in two spatial dimensions (2D) and use this Ansatz to find an unknown ground state of a 2D quantum system. Results in the simple 2D quantum Ising…

其他凝聚态物理 · 物理学 2016-09-08 Lukasz Cincio , Jacek Dziarmaga , Marek M. Rams

The multi-scale entanglement renormalization ansatz (MERA) provides a natural description of the ground state of a quantum critical Hamiltonian on the lattice. From an optimized MERA, one can extract the scaling dimensions of the underlying…

强关联电子 · 物理学 2022-12-14 Javier Argüello-Luengo , Ashley Milsted , Guifre Vidal

Understanding the limiting capabilities of classical methods in simulating complex quantum systems is of paramount importance for quantum technologies. Although many advanced approaches have been proposed and recently used to challenge…

量子物理 · 物理学 2025-02-05 I. A. Luchnikov , A. V. Berezutskii , A. K. Fedorov

We describe an algorithm to simulate time evolution using the Multi-scale Entanglement Renormalization Ansatz (MERA) and test it by studying a critical Ising chain with periodic boundary conditions and with up to L ~ 10^6 quantum spins. The…

量子物理 · 物理学 2008-06-09 Matteo Rizzi , Simone Montangero , Guifre' Vidal

We show how to build a multi-scale entanglement renormalization ansatz (MERA) representation of the ground state of a many-body Hamiltonian $H$ by applying the recently proposed \textit{tensor network renormalization} (TNR) [G. Evenbly and…

强关联电子 · 物理学 2015-11-18 Glen Evenbly , Guifre Vidal

We propose and test a scheme for entanglement renormalization capable of addressing large two-dimensional quantum lattice systems. In a translationally invariant system, the cost of simulations grows only as the logarithm of the lattice…

强关联电子 · 物理学 2013-05-29 Glen Evenbly , Guifre Vidal

We demonstrate, in the context of quadratic fermion lattice models in one and two spatial dimensions, the potential of entanglement renormalization (ER) to define a proper real-space renormalization group transformation. Our results show,…

量子物理 · 物理学 2015-05-13 G. Evenbly , G. Vidal

The use of entanglement renormalization in the presence of scale invariance is investigated. We explain how to compute an accurate approximation of the critical ground state of a lattice model, and how to evaluate local observables,…

强关联电子 · 物理学 2009-04-10 Robert N. C. Pfeifer , Glen Evenbly , Guifre Vidal

Monte Carlo sampling techniques have been proposed as a strategy to reduce the computational cost of contractions in tensor network approaches to solving many-body systems. Here we put forward a variational Monte Carlo approach for the…

强关联电子 · 物理学 2012-05-01 Andrew J. Ferris , Guifre Vidal

We investigate the scaling of entanglement entropy in both the multi-scale entanglement renormalization ansatz (MERA) and in its generalization, the branching MERA. We provide analytical upper bounds for this scaling, which take the general…

量子物理 · 物理学 2014-06-18 Glen Evenbly , Guifre Vidal

This paper demonstrates a method for tensorizing neural networks based upon an efficient way of approximating scale invariant quantum states, the Multi-scale Entanglement Renormalization Ansatz (MERA). We employ MERA as a replacement for…

神经与进化计算 · 计算机科学 2018-12-14 Andrew Hallam , Edward Grant , Vid Stojevic , Simone Severini , Andrew G. Green

The multi-scale entanglement renormalization ansatz (MERA) is a hierarchical class of tensor network states motivated by the real-space renormalization group. It is used to simulate strongly correlated quantum many-body systems. For…

强关联电子 · 物理学 2025-01-07 Thomas Barthel , Qiang Miao

The multiscale entanglement renormalization ansatz (MERA) provides a constructive algorithm for realizing wavefunctions that are inherently scale invariant. Unlike conformally invariant partition functions however, the finite bond dimension…

强关联电子 · 物理学 2020-10-21 Karel Van Acoleyen , Andrew Hallam , Matthias Bal , Markus Hauru , Jutho Haegeman , Frank Verstraete

The multi-scale entanglement renormalisation ansatz (MERA) is argued to provide a natural description for topological states of matter. The case of Kitaev's toric code is analyzed in detail and shown to possess a remarkably simple MERA…

强关联电子 · 物理学 2008-02-22 Miguel Aguado , Guifre Vidal

I present an example of how to analytically optimize a multiscale entanglement renormalization ansatz for a finite antiferromagnetic Heisenberg chain. For this purpose, a quantum-circuit representation is taken into account, and we…

数学物理 · 物理学 2016-08-09 Hiroaki Matsueda

We use TensorNetwork [C. Roberts et al., arXiv: 1905.01330], a recently developed API for performing tensor network contractions using accelerated backends such as TensorFlow, to implement an optimization algorithm for the Multi-scale…

计算物理 · 物理学 2019-07-01 Martin Ganahl , Ashley Milsted , Stefan Leichenauer , Jack Hidary , Guifre Vidal

Real-space renormalization approaches for quantum lattice systems generate certain hierarchical classes of states that are subsumed by the multi-scale entanglement renormalization ansatz (MERA). It is shown that, with the exception of one…

量子物理 · 物理学 2010-07-16 Thomas Barthel , Martin Kliesch , Jens Eisert

By combining the Grassmann algebra with multi-scale entanglement renormalization ansatz (MERA), we introduce a new unbiased and effective numerical method for simulating 2D strongly correlated electronic systems. The new GMERA method…

强关联电子 · 物理学 2015-06-12 Jie Lou , Yan Chen
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