Nonstabilizerness via Matrix Product States in the Pauli Basis

Nonstabilizerness, also known as "magic," stands as a crucial resource for achieving a potential advantage in quantum computing. Its connection to many-body physical phenomena is poorly understood at present, mostly due to a lack of practical methods to compute it at large scales. We prese...

Full description

Saved in:
Bibliographic Details
Published inPhysical review letters Vol. 133; no. 1; p. 010601
Main Authors Tarabunga, Poetri Sonya, Tirrito, Emanuele, Bañuls, Mari Carmen, Dalmonte, Marcello
Format Journal Article
LanguageEnglish
Published United States 05.07.2024
Online AccessGet more information

Cover

Loading…
More Information
Summary:Nonstabilizerness, also known as "magic," stands as a crucial resource for achieving a potential advantage in quantum computing. Its connection to many-body physical phenomena is poorly understood at present, mostly due to a lack of practical methods to compute it at large scales. We present a novel approach for the evaluation of nonstabilizerness within the framework of matrix product states (MPSs), based on expressing the MPS directly in the Pauli basis. Our framework provides a powerful tool for efficiently calculating various measures of nonstabilizerness, including stabilizer Rényi entropies, stabilizer nullity, and Bell magic, and enables the learning of the stabilizer group of an MPS. We showcase the efficacy and versatility of our method in the ground states of Ising and XXZ spin chains, as well as in circuits dynamics that has recently been realized in Rydberg atom arrays, where we provide concrete benchmarks for future experiments on logical qubits up to twice the sizes already realized.
ISSN:1079-7114
DOI:10.1103/PhysRevLett.133.010601