Experimental study of quantum uncertainty from lack of information
- URL: http://arxiv.org/abs/2105.09005v3
- Date: Thu, 4 May 2023 06:17:37 GMT
- Title: Experimental study of quantum uncertainty from lack of information
- Authors: Yuan-Yuan Zhao, Filip Rozp\k{e}dek, Zhibo Hou, Kang-Da Wu, Guo-Yong
Xiang, Chuan-Feng Li, and Guang-Can Guo
- Abstract summary: The uncertainty in the classical domain comes from the lack of information about the exact state of the system.
In this paper we investigate the issue experimentally by implementing the corresponding two-dimensional and three-dimensional guessing games.
Our results confirm that within the guessing-game framework, the quantum uncertainty to a large extent relies on the fact that quantum information determining the key properties of the game is stored in the degrees of freedom that remain inaccessible to the guessing party.
- Score: 3.901856932788151
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Quantum uncertainty is a well-known property of quantum mechanics that states
the impossibility of predicting measurement outcomes of multiple incompatible
observables simultaneously. In contrast, the uncertainty in the classical
domain comes from the lack of information about the exact state of the system.
One may naturally ask, whether the quantum uncertainty is indeed a fully
intrinsic property of the quantum theory, or whether similarly to the classical
domain lack of knowledge about specific parts of the physical system might be
the source of this uncertainty. This question has been addressed in the
previous literature where the authors argue that in the entropic formulation of
the uncertainty principle that can be illustrated using the, so-called,
guessing games, indeed such lack of information has a significant contribution
to the arising quantum uncertainty. Here we investigate this issue
experimentally by implementing the corresponding two-dimensional and
three-dimensional guessing games. Our results confirm that within the
guessing-game framework, the quantum uncertainty to a large extent relies on
the fact that quantum information determining the key properties of the game is
stored in the degrees of freedom that remain inaccessible to the guessing
party. Moreover, we offer an experimentally compact method to construct the
high-dimensional Fourier gate which is a major building block for various tasks
in quantum computation, quantum communication, and quantum metrology.
Related papers
- A computational test of quantum contextuality, and even simpler proofs of quantumness [43.25018099464869]
We show that an arbitrary contextuality game can be compiled into an operational "test of contextuality" involving a single quantum device.
Our work can be seen as using cryptography to enforce spatial separation within subsystems of a single quantum device.
arXiv Detail & Related papers (2024-05-10T19:30:23Z) - Quantum Conformal Prediction for Reliable Uncertainty Quantification in
Quantum Machine Learning [47.991114317813555]
Quantum models implement implicit probabilistic predictors that produce multiple random decisions for each input through measurement shots.
This paper proposes to leverage such randomness to define prediction sets for both classification and regression that provably capture the uncertainty of the model.
arXiv Detail & Related papers (2023-04-06T22:05:21Z) - Characterizing high-dimensional quantum contextuality [1.085294773316861]
Quantum contextuality is an essential resource in many quantum information processing tasks.
We provide systematic reliable methods for characterizing quantum contextuality in systems of fixed dimension.
As an application, our methods reveal the non-dimensional quantum contextuality structure.
arXiv Detail & Related papers (2022-12-22T09:31:37Z) - Quantum indistinguishability through exchangeable desirable gambles [69.62715388742298]
Two particles are identical if all their intrinsic properties, such as spin and charge, are the same.
Quantum mechanics is seen as a normative and algorithmic theory guiding an agent to assess her subjective beliefs represented as (coherent) sets of gambles.
We show how sets of exchangeable observables (gambles) may be updated after a measurement and discuss the issue of defining entanglement for indistinguishable particle systems.
arXiv Detail & Related papers (2021-05-10T13:11:59Z) - Quantum Causal Inference in the Presence of Hidden Common Causes: an
Entropic Approach [34.77250498401055]
We put forth a new theoretical framework for merging quantum information science and causal inference by exploiting entropic principles.
We apply our proposed framework to an experimentally relevant scenario of identifying message senders on quantum noisy links.
This approach can lay the foundations of identifying originators of malicious activity on future multi-node quantum networks.
arXiv Detail & Related papers (2021-04-24T22:45:50Z) - Quantum correlations and quantum-memory-assisted entropic uncertainty
relation in a quantum dot system [0.0]
Uncertainty principle is one of the comprehensive and fundamental concept in quantum theory.
We will study the quantum correlation and quantum memory assisted entropic uncertainty in a quantum dot system.
arXiv Detail & Related papers (2020-06-08T05:16:09Z) - Multiple uncertainty relation for accelerated quantum information [8.598192865991367]
We demonstrate a relativistic protocol of an uncertainty game in the presence of localized fermionic quantum fields inside cavities.
A novel lower bound for entropic uncertainty relations with multiple quantum memories is given in terms of the Holevo quantity.
arXiv Detail & Related papers (2020-04-21T03:29:39Z) - The Uncertainty Principle of Quantum Processes [6.2997667081978825]
We show that the uncertainty principle can be reformulated to include process-measurements that are performed on quantum channels.
We obtain expressions that generalize the Maassen-Uffink uncertainty relation and the universal uncertainty relations from quantum states to quantum channels.
arXiv Detail & Related papers (2020-04-11T06:03:30Z) - Entropic Uncertainty Relations and the Quantum-to-Classical transition [77.34726150561087]
We aim to shed some light on the quantum-to-classical transition as seen through the analysis of uncertainty relations.
We employ entropic uncertainty relations to show that it is only by the inclusion of imprecision in our model of macroscopic measurements that we can prepare a system with two simultaneously well-defined quantities.
arXiv Detail & Related papers (2020-03-04T14:01:17Z) - Quantum Mechanical description of Bell's experiment assumes Locality [91.3755431537592]
Bell's experiment description assumes the (Quantum Mechanics-language equivalent of the classical) condition of Locality.
This result is complementary to a recently published one demonstrating that non-Locality is necessary to describe said experiment.
It is concluded that, within the framework of Quantum Mechanics, there is absolutely no reason to believe in the existence of non-Local effects.
arXiv Detail & Related papers (2020-02-27T15:04:08Z) - An optimal measurement strategy to beat the quantum uncertainty in
correlated system [0.6091702876917281]
Uncertainty principle undermines the precise measurement of incompatible observables.
Entanglement, another unique feature of quantum physics, was found may help to reduce the quantum uncertainty.
arXiv Detail & Related papers (2020-02-23T05:27:36Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.