Saved in:
Bibliographic Details
Main Authors: Duschenes, Matthew, García-Martín, Diego, Holmes, Zoë, Cerezo, M.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2511.12700
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866912716062457856
author Duschenes, Matthew
García-Martín, Diego
Holmes, Zoë
Cerezo, M.
author_facet Duschenes, Matthew
García-Martín, Diego
Holmes, Zoë
Cerezo, M.
contents Moments of ensembles of unitaries play a central role in quantum information theory as they capture the statistical properties of dynamics of systems with some form of randomness. Indeed, concepts such as approximate $t$-designs arise when comparing how close an associated moment operator of a given unitary ensemble is to that of another, reference ensemble. Despite the importance of moment operators, their properties have not been as explored for quantum channels. In this work we develop a theoretical framework to compute moment operators for ensembles of quantum channels, for all moment orders $t$, with a special focus on determining ensembles that can be used as points of reference. By deriving hierarchies between ensembles, via inequalities of their moment operator norms, we give them operational meaning, and define useful concepts such as that of channel $t$-designs. Finally, we perform theoretical and numerical studies which show that different types of noise can decrease the norm of the moment operators (e.g., depolarizing noise), as well as increase it (e.g., amplitude damping), and generalize noise-induced concentration phenomena to channel-design-induced phenomena. Along the way, we find a block-orthogonal basis for permutations, which greatly simplifies our analyses, and may be of independent interest.
format Preprint
id arxiv_https___arxiv_org_abs_2511_12700
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Moments of quantum channel ensembles
Duschenes, Matthew
García-Martín, Diego
Holmes, Zoë
Cerezo, M.
Quantum Physics
Statistical Mechanics
Moments of ensembles of unitaries play a central role in quantum information theory as they capture the statistical properties of dynamics of systems with some form of randomness. Indeed, concepts such as approximate $t$-designs arise when comparing how close an associated moment operator of a given unitary ensemble is to that of another, reference ensemble. Despite the importance of moment operators, their properties have not been as explored for quantum channels. In this work we develop a theoretical framework to compute moment operators for ensembles of quantum channels, for all moment orders $t$, with a special focus on determining ensembles that can be used as points of reference. By deriving hierarchies between ensembles, via inequalities of their moment operator norms, we give them operational meaning, and define useful concepts such as that of channel $t$-designs. Finally, we perform theoretical and numerical studies which show that different types of noise can decrease the norm of the moment operators (e.g., depolarizing noise), as well as increase it (e.g., amplitude damping), and generalize noise-induced concentration phenomena to channel-design-induced phenomena. Along the way, we find a block-orthogonal basis for permutations, which greatly simplifies our analyses, and may be of independent interest.
title Moments of quantum channel ensembles
topic Quantum Physics
Statistical Mechanics
url https://arxiv.org/abs/2511.12700