Related papers: Multi-observable Uncertainty Equality based on the sum of standard deviations in the qubit system

Multi-observable Uncertainty Equality based on the sum of standard deviations in the qubit system

URL: http://arxiv.org/abs/2006.03314v1
Date: Fri, 5 Jun 2020 08:55:57 GMT
Title: Multi-observable Uncertainty Equality based on the sum of standard deviations in the qubit system
Authors: Xiao Zheng, Shaoqiang Ma, Guofeng Zhang
Abstract summary: We construct a multi-observable uncertainty equality and an inequality based on the sum of standard deviations in the qubit system. The inequality can provide a tighter lower bound, and the tightness can be maintained at a high level even in an open system.
Score: 4.651230507491374
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We construct a multi-observable uncertainty equality as well as an inequality based on the sum of standard deviations in the qubit system. The obtained equality indicates that the uncertainty relation can be expressed more accurately, and also can be used to detect the mixedness of the system. Meanwhile, the new uncertainty inequality can provide a tighter lower bound, and the tightness can be maintained at a high level even in an open system. Furthermore, the deficiency of the uncertainty relation, that the lower bound of the product form uncertainty relations can be null even for two incompatible observables, can be completely fixed by the new uncertainty relation.

Related papers

Quantum Uncertainty Equalities and Inequalities for Unitary Operators [0.0]
We find two uncertainty equalities for unitary operators, which are minimized by any pure states. We derive two sets of uncertainty inequalities that unveil hierarchical structures within the realm of unitary operator uncertainty.
arXiv Detail & Related papers (2024-01-15T01:14:57Z)
Enhanced quantum channel uncertainty relations by skew information [6.725873222183076]
Skew information-based uncertainty sequences are developed for any two quantum channels. A reinforced version of the Cauchy-Schwarz inequality is adopted to improve the uncertainty relation. A sampling technique of observables' coordinates is used to offset randomness in the inequality.
arXiv Detail & Related papers (2023-10-09T18:14:20Z)
Binary Classification with Confidence Difference [100.08818204756093]
This paper delves into a novel weakly supervised binary classification problem called confidence-difference (ConfDiff) classification. We propose a risk-consistent approach to tackle this problem and show that the estimation error bound the optimal convergence rate. We also introduce a risk correction approach to mitigate overfitting problems, whose consistency and convergence rate are also proven.
arXiv Detail & Related papers (2023-10-09T11:44:50Z)
Stronger Reverse Uncertainty Relation for Multiple Incompatible Observables [8.18367131708069]
We introduce a new interesting concept of reverse uncertainty relation. It indicates that one cannot only prepare quantum states with joint small uncertainty, but also with joint great uncertainty for incompatible observables. The application of the new uncertainty relation in purity detection is discussed.
arXiv Detail & Related papers (2023-08-25T12:07:28Z)
Model-Based Uncertainty in Value Functions [89.31922008981735]
We focus on characterizing the variance over values induced by a distribution over MDPs. Previous work upper bounds the posterior variance over values by solving a so-called uncertainty Bellman equation. We propose a new uncertainty Bellman equation whose solution converges to the true posterior variance over values.
arXiv Detail & Related papers (2023-02-24T09:18:27Z)
Dense Uncertainty Estimation via an Ensemble-based Conditional Latent Variable Model [68.34559610536614]
We argue that the aleatoric uncertainty is an inherent attribute of the data and can only be correctly estimated with an unbiased oracle model. We propose a new sampling and selection strategy at train time to approximate the oracle model for aleatoric uncertainty estimation. Our results show that our solution achieves both accurate deterministic results and reliable uncertainty estimation.
arXiv Detail & Related papers (2021-11-22T08:54:10Z)
Experimental test of the majorization uncertainty relation with mixed states [6.613272059966484]
The uncertainty relation lies at the heart of quantum theory and behaves as a non-classical constraint on the indeterminacies of incompatible observables in a system. In this work we test the novel majorization uncertainty relations of three incompatible observables using a series of mixed states with adjustable mixing degrees.
arXiv Detail & Related papers (2021-04-07T01:18:32Z)
Approaching Neural Network Uncertainty Realism [53.308409014122816]
Quantifying or at least upper-bounding uncertainties is vital for safety-critical systems such as autonomous vehicles. We evaluate uncertainty realism -- a strict quality criterion -- with a Mahalanobis distance-based statistical test. We adopt it to the automotive domain and show that it significantly improves uncertainty realism compared to a plain encoder-decoder model.
arXiv Detail & Related papers (2021-01-08T11:56:12Z)
On Lower Bounds for Standard and Robust Gaussian Process Bandit Optimization [55.937424268654645]
We consider algorithm-independent lower bounds for the problem of black-box optimization of functions having a bounded norm. We provide a novel proof technique for deriving lower bounds on the regret, with benefits including simplicity, versatility, and an improved dependence on the error probability.
arXiv Detail & Related papers (2020-08-20T03:48:14Z)
Uncertainty relations based on Wigner-Yanase skew information [0.0]
We use certain norm inequalities to obtain new uncertain relations based on the Wigner-Yanase skew information. First for an arbitrary finite number of observables we derive an uncertainty relation outperforming previous lower bounds. We then propose new weighted uncertainty relations for two noncompatible observables.
arXiv Detail & Related papers (2020-06-17T02:02:33Z)
Distributing entanglement with separable states: assessment of encoding and decoding imperfections [55.41644538483948]
Entanglement can be distributed using a carrier which is always separable from the rest of the systems involved. We consider the effect of incoherent dynamics acting alongside imperfect unitary interactions. We show that entanglement gain is possible even with substantial unitary errors.
arXiv Detail & Related papers (2020-02-11T15:25:19Z)

This list is automatically generated from the titles and abstracts of the papers in this site.