Absolute Dimensionality of Quantum Ensembles
Bernal, Alexander ; Cobucci, Gabriele LU
; Renner, Martin J.
LU
and Tavakoli, Armin
LU
(2024)
In Physical Review Letters
133(24).
- Abstract
The dimension of a quantum state is traditionally seen as the number of superposed distinguishable states in a given basis. We propose an absolute, i.e., basis-independent, notion of dimensionality for ensembles of quantum states. It is based on whether a quantum ensemble can be simulated with states confined to arbitrary lower-dimensional subspaces and classical postprocessing. In order to determine the absolute dimension of quantum ensembles, we develop both analytical witness criteria and a semidefinite programming criterion based on the ensemble's information capacity. Furthermore, we construct explicit simulation models for arbitrary ensembles of pure quantum states subject to white noise, and in natural cases we prove their... (More)
The dimension of a quantum state is traditionally seen as the number of superposed distinguishable states in a given basis. We propose an absolute, i.e., basis-independent, notion of dimensionality for ensembles of quantum states. It is based on whether a quantum ensemble can be simulated with states confined to arbitrary lower-dimensional subspaces and classical postprocessing. In order to determine the absolute dimension of quantum ensembles, we develop both analytical witness criteria and a semidefinite programming criterion based on the ensemble's information capacity. Furthermore, we construct explicit simulation models for arbitrary ensembles of pure quantum states subject to white noise, and in natural cases we prove their optimality. Also, efficient numerical methods are provided for simulating generic ensembles. Finally, we discuss the role of absolute dimensionality in high-dimensional quantum information processing.
(Less)
- author
- Bernal, Alexander
; Cobucci, Gabriele
LU
; Renner, Martin J.
LU
and Tavakoli, Armin
LU
- organization
- publishing date
- 2024-12
- type
- Contribution to journal
- publication status
- published
- subject
- in
- Physical Review Letters
- volume
- 133
- issue
- 24
- article number
- 240203
- publisher
- American Physical Society
- external identifiers
-
- pmid:39750369
- scopus:85212439246
- ISSN
- 0031-9007
- DOI
- 10.1103/PhysRevLett.133.240203
- language
- English
- LU publication?
- yes
- id
- ac1f6f86-5f5b-4f7a-96d8-d902c6758f32
- date added to LUP
- 2025-01-17 12:09:25
- date last changed
- 2025-07-05 02:26:26
@article{ac1f6f86-5f5b-4f7a-96d8-d902c6758f32,
abstract = {{<p>The dimension of a quantum state is traditionally seen as the number of superposed distinguishable states in a given basis. We propose an absolute, i.e., basis-independent, notion of dimensionality for ensembles of quantum states. It is based on whether a quantum ensemble can be simulated with states confined to arbitrary lower-dimensional subspaces and classical postprocessing. In order to determine the absolute dimension of quantum ensembles, we develop both analytical witness criteria and a semidefinite programming criterion based on the ensemble's information capacity. Furthermore, we construct explicit simulation models for arbitrary ensembles of pure quantum states subject to white noise, and in natural cases we prove their optimality. Also, efficient numerical methods are provided for simulating generic ensembles. Finally, we discuss the role of absolute dimensionality in high-dimensional quantum information processing.</p>}},
author = {{Bernal, Alexander and Cobucci, Gabriele and Renner, Martin J. and Tavakoli, Armin}},
issn = {{0031-9007}},
language = {{eng}},
number = {{24}},
publisher = {{American Physical Society}},
series = {{Physical Review Letters}},
title = {{Absolute Dimensionality of Quantum Ensembles}},
url = {{http://dx.doi.org/10.1103/PhysRevLett.133.240203}},
doi = {{10.1103/PhysRevLett.133.240203}},
volume = {{133}},
year = {{2024}},
}