Related papers: Finite-Depth Preparation of Tensor Network States from Measurement

Finite-Depth Preparation of Tensor Network States from Measurement

URL: http://arxiv.org/abs/2404.17087v1
Date: Fri, 26 Apr 2024 00:37:00 GMT
Title: Finite-Depth Preparation of Tensor Network States from Measurement
Authors: Rahul Sahay, Ruben Verresen,
Abstract summary: We explore criteria on the local tensors for enabling deterministic state preparation via a single round of measurements. We use these criteria to construct families of measurement-preparable states in one and two dimensions. Our protocol even allows one to engineer preparable quantum states with a range of desired correlation lengths and entanglement properties.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Although tensor network states constitute a broad range of exotic quantum states, their realization is challenging and often requires resources whose depth scales with system size. In this work, we explore criteria on the local tensors for enabling deterministic state preparation via a single round of measurements and on-site unitary feedback. We use these criteria to construct families of measurement-preparable states in one and two dimensions, tuning between distinct symmetry-breaking, symmetry-protected, and intrinsic topological phases of matter. For instance, in one dimension we chart out a three-parameter family of preparable states which interpolate between the AKLT, cluster, GHZ and other states of interest. Our protocol even allows one to engineer preparable quantum states with a range of desired correlation lengths and entanglement properties. In addition to such constructive approaches, we present diagnostics for verifying whether a given tensor network state is preparable using measurements. We conclude by charting out generalizations, such as considering multiple rounds of measurements, implementing matrix product operators, and using incomplete basis measurements.

Related papers

Classification of joint quantum measurements based on entanglement cost of localization [42.72938925647165]
We propose a systematic classification of joint measurements based on entanglement cost. We show how to numerically explore higher levels and construct generalizations to higher dimensions and multipartite settings.
arXiv Detail & Related papers (2024-08-01T18:00:01Z)
Classifying One-Dimensional Quantum States Prepared by a Single Round of Measurements [0.0]
We characterize the patterns of many-body entanglement that can be deterministically created from measurement. We show this creates matrix product states and identify necessary and sufficient tensor conditions for preparability. We find a trade-off between the richness of the preparable entanglement spectrum and correlation functions, which leads to a no-go theorem for preparing certain quantum states.
arXiv Detail & Related papers (2024-04-25T17:10:22Z)
Measurement-Device-Independent Detection of Beyond-Quantum State [53.64687146666141]
We propose a measurement-device-independent (MDI) test for beyond-quantum state detection. We discuss the importance of tomographic completeness of the input sets to the detection.
arXiv Detail & Related papers (2023-12-11T06:40:13Z)
Enhanced Entanglement in the Measurement-Altered Quantum Ising Chain [46.99825956909532]
Local quantum measurements do not simply disentangle degrees of freedom, but may actually strengthen the entanglement in the system. This paper explores how a finite density of local measurement modifies a given state's entanglement structure.
arXiv Detail & Related papers (2023-10-04T09:51:00Z)
Detecting Entanglement by State Preparation and a Fixed Measurement [7.818765015637801]
Entanglement detection by state preparation can be extended to multipartite states such as graph states. We present network states for both cases to construct decomposable entanglement witnesses. Results readily apply to a realistic scenario, for instance, an array of superconducting qubits.
arXiv Detail & Related papers (2023-03-29T00:30:27Z)
Evolution of many-body systems under ancilla quantum measurements [58.720142291102135]
We study the concept of implementing quantum measurements by coupling a many-body lattice system to an ancillary degree of freedom. We find evidence of a disentangling-entangling measurement-induced transition as was previously observed in more abstract models.
arXiv Detail & Related papers (2023-03-13T13:06:40Z)
Deterministic constant-depth preparation of the AKLT state on a quantum processor using fusion measurements [0.2007262412327553]
The ground state of the spin-1 Affleck, Kennedy, Lieb and TasakiAKLT model is a paradigmatic example of both a matrix product state and a symmetry-protected topological phase. Having a nonzero correlation length, the AKLT state cannot be exactly prepared by a constant-depth unitary circuit composed of local gates. We demonstrate that this no-go limit can be evaded by augmenting a constant-depth circuit with fusion measurements.
arXiv Detail & Related papers (2022-10-31T17:58:01Z)
Probing sign structure using measurement-induced entanglement [1.2233362977312945]
A diagnostic measurement-induced entanglement (MIE) is created between two parties after measuring the rest of the system. We prove that MIE is upper bounded by mutual information for sign-free stabilizer states. We also show that for sign-free qubit wavefunctions, MIE between two qubits is upper bounded by a simple two-point correlation function.
arXiv Detail & Related papers (2022-05-11T18:00:01Z)
Generalized quantum measurements with matrix product states: Entanglement phase transition and clusterization [58.720142291102135]
We propose a method for studying the time evolution of many-body quantum lattice systems under continuous and site-resolved measurement. We observe a peculiar phenomenon of measurement-induced particle clusterization that takes place only for frequent moderately strong measurements, but not for strong infrequent measurements.
arXiv Detail & Related papers (2021-04-21T10:36:57Z)
Observing a Topological Transition in Weak-Measurement-Induced Geometric Phases [55.41644538483948]
Weak measurements in particular, through their back-action on the system, may enable various levels of coherent control. We measure the geometric phases induced by sequences of weak measurements and demonstrate a topological transition in the geometric phase controlled by measurement strength. Our results open new horizons for measurement-enabled quantum control of many-body topological states.
arXiv Detail & Related papers (2021-02-10T19:00:00Z)
State preparation and measurement in a quantum simulation of the O(3) sigma model [65.01359242860215]
We show that fixed points of the non-linear O(3) sigma model can be reproduced near a quantum phase transition of a spin model with just two qubits per lattice site. We apply Trotter methods to obtain results for the complexity of adiabatic ground state preparation in both the weak-coupling and quantum-critical regimes. We present and analyze a quantum algorithm based on non-unitary randomized simulation methods.
arXiv Detail & Related papers (2020-06-28T23:44:12Z)

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