Measurement Geometry as a Resource for Certifying Network Nonlocality
摘要
Quantum networks can exhibit nonclassical correlations that cannot be explained by classical models with independent sources. While the role of entanglement is well understood, the impact of measurement design remains largely unexplored. Here we develop an operational framework for certifying network nonlocality in the bilocal Alice--Bob--Charlie network using ancilla-assisted meters to evaluate the nonlocal observables required for bilocal and fully network nonlocal (FNN) witnesses. The approach successfully reproduces both bilocal and FNN correlations in simulation. On the 156-qubit superconducting processor \textit{ibm\_kingston}, we observe bilocal nonlocality with after readout-error mitigation, while the FNN witnesses reach and of their certification thresholds, implying the substantially stronger requirements for FNN certification. We further show that Bob's joint measurement determines the accessible level of network nonlocality: bilocal and FNN certification are optimized by different measurement settings, while both violations can disappear even for maximally entangled states. These results identify measurement geometry as an independent resource for network nonlocality and provide a practical route toward its certification on programmable quantum processors.
引用
@article{arxiv.2607.04656,
title = {Measurement Geometry as a Resource for Certifying Network Nonlocality},
author = {Leon Adachi and Le Bin Ho},
journal= {arXiv preprint arXiv:2607.04656},
year = {2026}
}
备注
11 pages, 9 figures