Related papers: Real-space RG, error correction and Petz map

Real-space RG, error correction and Petz map

URL: http://arxiv.org/abs/2012.14001v4
Date: Tue, 21 Dec 2021 15:18:33 GMT
Title: Real-space RG, error correction and Petz map
Authors: Keiichiro Furuya, Nima Lashkari, Shoy Ouseph
Abstract summary: We study the error correction properties of the real-space renormalization group (RG) Second, we study the operator algebra exact quantum error correction for any von Neumann algebra.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: There are two parts to this work: First, we study the error correction properties of the real-space renormalization group (RG). The long-distance operators are the (approximately) correctable operators encoded in the physical algebra of short-distance operators. This is closely related to modeling the holographic map as a quantum error correction code. As opposed to holography, the real-space RG of a many-body quantum system does not have the complementary recovery property. We discuss the role of large $N$ and a large gap in the spectrum of operators in the emergence of complementary recovery. Second, we study the operator algebra exact quantum error correction for any von Neumann algebra. We show that similar to the finite dimensional case, for any error map in between von Neumann algebras the Petz dual of the error map is a recovery map if the inclusion of the correctable subalgebra of operators has finite index.

Related papers

Deformed Heisenberg algebra and its Hilbert space representations [0.0]
A deformation of Heisenberg algebra induces among other consequences a loss of Hermiticity of some operators that generate this algebra.<n>We propose a position deformation of Heisenberg algebra with both maximal length and minimal momentum uncertainties.
arXiv Detail & Related papers (2026-02-17T18:41:30Z)
The Structure and Interpretation of Quantum Programs I: Foundations [0.0]
Qubits are a great way to build a quantum computer, but a limited way to program one.<n>We replace the usual "states and gates" formalism with a "props and ops" (propositions and operators) model.<n>We show how measurement modifies state, proving an operator-algebraic version of the Knill-Laflamme conditions.
arXiv Detail & Related papers (2025-09-03T18:00:23Z)
On Infinite Tensor Networks, Complementary Recovery and Type II Factors [39.58317527488534]
We study local operator algebras at the boundary of infinite tensor networks. We decompose the limiting Hilbert space and the algebras of observables in a way that keeps track of the entanglement in the network.
arXiv Detail & Related papers (2025-03-31T18:00:09Z)
Geometric structure and transversal logic of quantum Reed-Muller codes [51.11215560140181]
In this paper, we aim to characterize the gates of quantum Reed-Muller (RM) codes by exploiting the well-studied properties of their classical counterparts. A set of stabilizer generators for a RM code can be described via $X$ and $Z$ operators acting on subcubes of particular dimensions.
arXiv Detail & Related papers (2024-10-10T04:07:24Z)
Homological Quantum Error Correction with Torsion [0.0]
This work is an exploration of the relevant topics, a journey from classical error correction, through homology theory, to CSS codes acting on qudit systems. We prove an original result, the Structure Theorem for the Qudit Logical Space. This work introduces our own abstracted and restricted version of the general notion of a cell complex, suited exactly to our needs.
arXiv Detail & Related papers (2024-05-06T15:28:21Z)
Hilbert space representation for quasi-Hermitian position-deformed Heisenberg algebra and Path integral formulation [0.0]
We show that position deformation of a Heisenberg algebra leads to loss of Hermiticity of some operators that generate this algebra. We then construct Hilbert space representations associated with these quasi-Hermitian operators that generate a quasi-Hermitian Heisenberg algebra. We demonstrate that the Euclidean propagator, action, and kinetic energy of this system are constrained by the standard classical mechanics limits.
arXiv Detail & Related papers (2024-04-10T15:11:59Z)
Operator Learning Renormalization Group [0.8192907805418583]
We present a general framework for quantum many-body simulations called the operator learning renormalization group (OLRG) Inspired by machine learning perspectives, OLRG is a generalization of Wilson's numerical renormalization group and White's density matrix renormalization group. We implement two versions of the operator maps for classical and quantum simulations.
arXiv Detail & Related papers (2024-03-05T18:37:37Z)
The Schmidt rank for the commuting operator framework [58.720142291102135]
The Schmidt rank is a measure for the entanglement dimension of a pure bipartite state. We generalize the Schmidt rank to the commuting operator framework. We analyze bipartite states and compute the Schmidt rank in several examples.
arXiv Detail & Related papers (2023-07-21T14:37:33Z)
Quantum Worst-Case to Average-Case Reductions for All Linear Problems [66.65497337069792]
We study the problem of designing worst-case to average-case reductions for quantum algorithms. We provide an explicit and efficient transformation of quantum algorithms that are only correct on a small fraction of their inputs into ones that are correct on all inputs.
arXiv Detail & Related papers (2022-12-06T22:01:49Z)
Constrained mixers for the quantum approximate optimization algorithm [55.41644538483948]
We present a framework for constructing mixing operators that restrict the evolution to a subspace of the full Hilbert space. We generalize the "XY"-mixer designed to preserve the subspace of "one-hot" states to the general case of subspaces given by a number of computational basis states. Our analysis also leads to valid Trotterizations for "XY"-mixer with fewer CX gates than is known to date.
arXiv Detail & Related papers (2022-03-11T17:19:26Z)
Representation of the Fermionic Boundary Operator [10.522527427240352]
We consider the problem of representing the full boundary operator on a quantum computer. We first prove that the boundary operator has a special structure in the form of a complete sum of fermionic creation and annihilation operators. We then use the fact that these operators pairwise anticommute to produce an $O(n)$-depth circuit that exactly implements the boundary operator without any Trotterization or Taylor series approximation errors.
arXiv Detail & Related papers (2022-01-27T13:42:57Z)
Quantum Error Correction with Gauge Symmetries [69.02115180674885]
Quantum simulations of Lattice Gauge Theories (LGTs) are often formulated on an enlarged Hilbert space containing both physical and unphysical sectors. We provide simple fault-tolerant procedures that exploit such redundancy by combining a phase flip error correction code with the Gauss' law constraint.
arXiv Detail & Related papers (2021-12-09T19:29:34Z)
Understanding holographic error correction via unique algebras and atomic examples [0.25782420501870296]
We introduce a fully constructive characterisation of holographic quantum error-correcting codes. We employ quantum circuits to construct a number of examples of holographic codes.
arXiv Detail & Related papers (2021-10-27T18:17:37Z)
Sub-bosonic (deformed) ladder operators [62.997667081978825]
We present a class of deformed creation and annihilation operators that originates from a rigorous notion of fuzziness. This leads to deformed, sub-bosonic commutation relations inducing a simple algebraic structure with modified eigenenergies and Fock states. In addition, we investigate possible consequences of the introduced formalism in quantum field theories, as for instance, deviations from linearity in the dispersion relation for free quasibosons.
arXiv Detail & Related papers (2020-09-10T20:53:58Z)

This list is automatically generated from the titles and abstracts of the papers in this site.