Entropic uncertainty relations and their applications
TL;DR: This review surveys entropic uncertainty relations that capture Heisenberg’s idea that the results of incompatible measurements are impossible to predict, covering both finite- and infinite-dimensional measurements.
read more
Abstract: Heisenberg’s uncertainty principle forms a fundamental element of quantum mechanics. Uncertainty relations in terms of entropies were initially proposed to deal with conceptual shortcomings in the original formulation of the uncertainty principle and, hence, play an important role in quantum foundations. More recently, entropic uncertainty relations have emerged as the central ingredient in the security analysis of almost all quantum cryptographic protocols, such as quantum key distribution and two-party quantum cryptography. This review surveys entropic uncertainty relations that capture Heisenberg’s idea that the results of incompatible measurements are impossible to predict, covering both finite- and infinite-dimensional measurements. These ideas are then extended to incorporate quantum correlations between the observed object and its environment, allowing for a variety of recent, more general formulations of the uncertainty principle. Finally, various applications are discussed, ranging from entanglement witnessing to wave-particle duality to quantum cryptography.
read more
Chat with Paper
AI Agents for this Paper
Find similar papers on Google Scholar, PubMed and Arxiv
Write a critical review of this paper
Analyze citations of this paper to find unaddressed research gaps
Citations
Electromagnetism in Quantum Mechanics
Reinhold A. Bertlmann,Nicolai Friis +1 more
- 07 Sep 2023
TL;DR: Electromagnetism in quantum mechanics explores the rigorous incorporation of electromagnetism in quantum mechanics, leading to the Pauli equation and gauge invariance. It also covers geometric effects such as the Aharonov-Bohm effect and the discovery of geometric phases. The chapter introduces differential geometry concepts and defines fiber bundles to understand these effects.
Optimized Entropic Uncertainty Relations for Multiple Measurements
Bo-Fu Xie,Fei Ming,Dong Wang,Liu Ye,Jing-Ling Chen +4 more
TL;DR: Researchers improve and optimize entropic uncertainty relations for multiple measurements, proposing a tighter lower bound (SCB) and an optimized bound (OSCB) that sheds light on entropy-based uncertainty relations and has implications for quantum key distributions.
Quantum Uncertainty Principles for Measurements with Interventions.
TL;DR: In this article , the authors demonstrate universal uncertainty principles for general interactive measurements involving arbitrary rounds of interventions and show that they imply an uncertainty trade-off between measurements compatible with different causal dependencies.
Steered quantum coherence and entropic uncertainty relation in the cluster Ising model
Biao‐Liang Ye,Qi‐Cheng Wu,Bao-qing Guo,Jun‐Long Zhao,Yu-Liang Fang,Y. H. Zhou +5 more
TL;DR: This study investigates the cluster Ising model using steered quantum coherence and entropic uncertainty relation, analyzing the behavior of L1 norm, relative entropy, and quantum Jensen-Shannon divergence, and comparing these measures with numerical results.
Entropic uncertainty and measurement reversibility
TL;DR: The entropic uncertainty relation with quantum side information (EUR-QSI) as mentioned in this paper is a unifying principle relating two distinctive features of quantum mechanics: quantum uncertainty due to measurement incompatibility, and entanglement.
References
A mathematical theory of communication
TL;DR: This final installment of the paper considers the case where the signals or the messages or both are continuously variable, in contrast with the discrete nature assumed until now.
74.4K
•Journal Article
The mathematical theory of communication
Claude E. Shannon,Warren Weaver +1 more
TL;DR: The Mathematical Theory of Communication (MTOC) as discussed by the authors was originally published as a paper on communication theory more than fifty years ago and has since gone through four hardcover and sixteen paperback printings.
36.2K
Can Quantum-Mechanical Description of Physical Reality Be Considered Complete?
TL;DR: Consideration of the problem of making predictions concerning a system on the basis of measurements made on another system that had previously interacted with it leads to the result that one is led to conclude that the description of reality as given by a wave function is not complete.
Quantum cryptography based on Bell's theorem.
TL;DR: Practical application of the generalized Bells theorem in the so-called key distribution process in cryptography is reported, based on the Bohms version of the Einstein-Podolsky-Rosen gedanken experiment andBells theorem is used to test for eavesdropping.
11.6K
Possible generalization of Boltzmann-Gibbs statistics
TL;DR: In this paper, a generalized form of entropy was proposed for the Boltzmann-Gibbs statistics with the q→1 limit, and the main properties associated with this entropy were established, particularly those corresponding to the microcanonical and canonical ensembles.
10K