Your search keyword '"Stefan Bäuml"' showing total 18 results

1. Security of discrete-modulated continuous-variable quantum key distribution

Author

Stefan Bäuml, Carlos Pascual-García, Victoria Wright, Omar Fawzi, and Antonio Acín

Subjects

Physics, QC1-999

Abstract

Continuous variable quantum key distribution with discrete modulation has the potential to provide information-theoretic security using widely available optical elements and existing telecom infrastructure. While their implementation is significantly simpler than that for protocols based on Gaussian modulation, proving their finite-size security against coherent attacks poses a challenge. In this work we prove finite-size security against coherent attacks for a discrete-modulated quantum key distribution protocol involving four coherent states and heterodyne detection. To do so, and contrary to most of the existing schemes, we first discretize all the continuous variables generated during the protocol. This allows us to use the entropy accumulation theorem, a tool that has previously been used in the setting of discrete variables, to construct the finite-size security proof. We then compute the corresponding finite-key rates through semi-definite programming and under a photon-number cutoff. Our analysis provides asymptotic rates in the range of $0.1-10^{-4}$ bits per round for distances up to hundred kilometres, while in the finite case and for realistic parameters, we get of the order of $10$ Gbits of secret key after $n\sim10^{11}$ rounds and distances of few tens of kilometres.

Published

2024

2. Universal Limitations on Quantum Key Distribution over a Network

Author

Siddhartha Das, Stefan Bäuml, Marek Winczewski, and Karol Horodecki

Subjects

Physics, QC1-999

Abstract

We consider the distribution of secret keys, both in a bipartite and a multipartite (conference) setting, via a quantum network and establish a framework to obtain bounds on the achievable rates. We show that any multipartite private state—the output of a protocol distilling secret key among the trusted parties—has to be genuinely multipartite entangled. In order to describe general network settings, we introduce a multiplex quantum channel, which links an arbitrary number of parties where each party can take the role of sender only, receiver only, or both sender and receiver. We define asymptotic and nonasymptotic local quantum operations and classical communication-assisted secret-key-agreement (SKA) capacities for multiplex quantum channels and provide strong and weak converse bounds. The structure of the protocols we consider, manifested by an adaptive strategy of secret-key and entanglement [Greenberger–Horne–Zeilinger (GHZ) state] distillation over an arbitrary multiplex quantum channel, is generic. As a result, our approach also allows us to study the performance of quantum key repeaters and measurement-device-independent quantum key distribution (MDI-QKD) setups. For teleportation-covariant multiplex quantum channels, we get upper bounds on the SKA capacities in terms of the entanglement measures of their Choi states. We also obtain bounds on the rates at which secret key and GHZ states can be distilled from a finite number of copies of an arbitrary multipartite quantum state. We are able to determine the capacities for MDI-QKD setups and rates of GHZ-state distillation for some cases of interest.

Published

2021

3. Versatile relative entropy bounds for quantum networks

Author

Luca Rigovacca, Go Kato, Stefan Bäuml, M S Kim, W J Munro, and Koji Azuma

Subjects

quantum communication, quantum networks, quantum information, Science, Physics, QC1-999

Abstract

We provide a versatile upper bound on the number of maximally entangled qubits, or private bits, shared by two parties via a generic adaptive communication protocol over a quantum network when the use of classical communication is not restricted. Although our result follows the idea of Azuma et al (2016 Nat. Commun. 7 13523) of splitting the network into two parts, our approach relaxes their strong restriction, consisting of the use of a single entanglement measure in the quantification of the maximum amount of entanglement generated by the channels. In particular, in our bound the measure can be chosen on a channel-by-channel basis, in order to make it as tight as possible. This enables us to apply the relative entropy of entanglement, which often gives a state-of-the-art upper bound, on every Choi-simulable channel in the network, even when the other channels do not satisfy this property. We also develop tools to compute, or bound, the max-relative entropy of entanglement for channels that are invariant under phase rotations. In particular, we present an analytical formula for the max-relative entropy of entanglement of the qubit amplitude damping channel.

Published

2018

4. Witnessing entanglement by proxy

Author

Stefan Bäuml, Dagmar Bruß, Marcus Huber, Hermann Kampermann, and Andreas Winter

Subjects

entanglement, entropy, thermodynamics, Science, Physics, QC1-999

Abstract

Entanglement is a ubiquitous feature of low temperature systems and believed to be highly relevant for the dynamics of condensed matter properties and quantum computation even at higher temperatures. The experimental certification of this paradigmatic quantum effect in macroscopic high temperature systems is constrained by the limited access to the quantum state of the system. In this paper we show how macroscopic observables beyond the mean energy of the system can be exploited as proxy witnesses for entanglement detection. Using linear and semi-definite relaxations we show that all previous approaches to this problem can be outperformed by our proxies, i.e. entanglement can be certified at higher temperatures without access to any local observable. For an efficient computation of proxy witnesses one can resort to a generalised grand canonical ensemble, enabling entanglement certification even in complex systems with macroscopic particle numbers.

Published

2015

5. Tools for quantum network design.

Author

Koji Azuma, Stefan Bäuml, Tim Coopmans, David Elkouss, and Boxi Li

Published

2020

6. Universal limitations on quantum key distribution over a network.

Author

Siddhartha Das, Stefan Bäuml, Marek Winczewski, and Karol Horodecki

Published

2019

7. Fundamental limits on the capacities of bipartite quantum interactions.

Author

Stefan Bäuml, Siddhartha Das, and Mark M. Wilde

Published

2018

8. Entanglement and secret-key-agreement capacities of bipartite quantum interactions and read-only memory devices.

Author

Siddhartha Das, Stefan Bäuml, and Mark M. Wilde

Published

2017

9. Limitations on Quantum Key Repeaters.

Author

Stefan Bäuml, Matthias Christandl, Karol Horodecki, and Andreas J. Winter 0002

Published

2014

10. Measurement-Device-Independent Entanglement Detection for Continuous-Variable Systems

Author

Daniel Cavalcanti, Paolo Abiuso, Stefan Bäuml, and Antonio Acín

Subjects

Quantum Physics, Computer science, Gaussian, FOS: Physical sciences, General Physics and Astronomy, Quantum entanglement, 16. Peace & justice, Topology, 01 natural sciences, Continuous variable, symbols.namesake, Measurement device, 0103 physical sciences, symbols, Coherent states, Quantum Physics (quant-ph), 010306 general physics, Protocol (object-oriented programming), Optics (physics.optics), Physics - Optics

Abstract

We study the detection of continuous-variable entanglement, for which most of the existing methods designed so far require a full specification of the devices, and we present protocols for entanglement detection in a scenario where the measurement devices are completely uncharacterised. We first generalise, to the continuous variable regime, the seminal results by Buscemi [PRL 108, 200401(2012)] and Branciard et al. [PRL 110, 060405 (2013)], showing that all entangled states can bedetected in this scenario. Most importantly, we then describe a practical protocol that allows for the measurement-device-independent certification of entanglement of all two-mode entangled Gaussian states. This protocol is feasible with current technology as it makes only use of standard optical setups such as coherent states and homodyne measurements., Accepted in PRL

Published

2021

11. Tools for quantum network design

Author

Tim Coopmans, Koji Azuma, Boxi Li, Stefan Bäuml, and David Elkouss

Subjects

FOS: Computer and information sciences, Scale (ratio), Computer Networks and Communications, Computer science, Distributed computing, Computer Science - Information Theory, FOS: Physical sciences, Parameter space, 01 natural sciences, 010305 fluids & plasmas, Computer Science - Networking and Internet Architecture, 0103 physical sciences, Electrical and Electronic Engineering, Physical and Theoretical Chemistry, 010306 general physics, Networking and Internet Architecture (cs.NI), Quantum network, Quantum Physics, Information Theory (cs.IT), Condensed Matter Physics, Telecommunications network, Atomic and Molecular Physics, and Optics, Electronic, Optical and Magnetic Materials, Term (time), Computational Theory and Mathematics, Quantum Physics (quant-ph)

Abstract

Quantum networks will enable the implementation of communication tasks with qualitative advantages with respect to the communication networks known today. While it is expected that the first demonstrations of small scale quantum networks will take place in the near term, many challenges remain to scale them. To compare different solutions, optimize over parameter space, and inform experiments, it is necessary to evaluate the performance of concrete quantum network scenarios. Here, the authors review the state-of-the-art of tools for evaluating the performance of quantum networks. The authors present them from three different angles: information-theoretic benchmarks, analytical tools, and simulation., AVS Quantum Science, 3 (1), ISSN:2639-0213

Published

2020

12. Linear programs for entanglement and key distribution in the quantum internet

Author

Stefan Bäuml, Koji Azuma, Go Kato, and David Elkouss

Subjects

Theoretical computer science, Generalization, Computer science, FOS: Physical sciences, General Physics and Astronomy, Key distribution, lcsh:Astrophysics, 0102 computer and information sciences, Quantum entanglement, 01 natural sciences, Steiner tree problem, symbols.namesake, Simple (abstract algebra), lcsh:QB460-466, 0103 physical sciences, 010306 general physics, Quantum Physics, Quantum network, lcsh:QC1-999, Multipartite, OA-Fund TU Delft, 010201 computation theory & mathematics, symbols, Bipartite graph, Quantum Physics (quant-ph), lcsh:Physics

Abstract

Quantum networks will allow to implement communication tasks beyond the reach of their classical counterparts. A pressing and necessary issue for the design of quantum network protocols is the quantification of the rates at which these tasks can be performed. Here, we propose a simple recipe that yields efficiently computable lower and upper bounds on the maximum achievable rates. For this we make use of the max-flow min-cut theorem and its generalization to multi-commodity flows to obtain linear programs. We exemplify our recipe deriving the linear programs for bipartite settings, settings where multiple pairs of users obtain entanglement in parallel as well as multipartite settings, covering almost all known situations. We also make use of a generalization of the concept of paths between user pairs in a network to Steiner trees spanning a group of users wishing to establish Greenberger-Horne-Zeilinger states., Comment: 37 pages, 10 figures. Published version

Published

2020

13. Entanglement and secret-key-agreement capacities of bipartite quantum interactions and read-only memory devices

Author

Stefan Bäuml, Mark M. Wilde, and Siddhartha Das

Subjects

FOS: Computer and information sciences, Computer Science - Information Theory, FOS: Physical sciences, Quantum entanglement, Entropy of entanglement, Topology, 01 natural sciences, Upper and lower bounds, 010305 fluids & plasmas, 0103 physical sciences, 010306 general physics, Quantum, Computer Science::Cryptography and Security, Computer Science::Information Theory, Physics, Quantum Physics, Reading (computer), Information Theory (cs.IT), TheoryofComputation_GENERAL, Généralités, Condensed Matter - Other Condensed Matter, Key (cryptography), Bipartite graph, Quantum Physics (quant-ph), Encoder, Other Condensed Matter (cond-mat.other)

Abstract

A bipartite quantum interaction corresponds to the most general quantum interaction that can occur between two quantum systems in the presence of a bath. In this work, we determine bounds on the capacities of bipartite interactions for entanglement generation and secret-key agreement between two quantum systems. Our upper bound on the entanglement generation capacity of a bipartite quantum interaction is given by a quantity called the bidirectional max-Rains information. Our upper bound on the secret-key-agreement capacity of a bipartite quantum interaction is given by a related quantity called the bidirectional max-relative entropy of entanglement. We also derive tighter upper bounds on the capacities of bipartite interactions obeying certain symmetries. Observing that reading of a memory device is a particular kind of bipartite quantum interaction, we leverage our bounds from the bidirectional setting to deliver bounds on the capacity of a task that we introduce, called private reading of a wiretap memory cell. Given a set of point-to-point quantum wiretap channels, the goal of private reading is for an encoder to form codewords from these channels, in order to establish a secret key with a party who controls one input and one output of the channels, while a passive eavesdropper has access to one output of the channels. We derive both lower and upper bounds on the private reading capacities of a wiretap memory cell. We then extend these results to determine achievable rates for the generation of entanglement between two distant parties who have coherent access to a controlled point-to-point channel, which is a particular kind of bipartite interaction., SCOPUS: ar.j, info:eu-repo/semantics/published

Published

2020

14. Versatile relative entropy bounds for quantum networks

Author

L. Rigovacca, Koji Azuma, Go Kato, Stefan Bäuml, William J. Munro, Myungshik Kim, Commission of the European Communities, Engineering & Physical Science Research Council (E, The Royal Society, and Samsung Electronics Co Ltd

Subjects

CRYPTOGRAPHY, Fluids & Plasmas, Physics, Multidisciplinary, General Physics and Astronomy, FOS: Physical sciences, SQUASHED ENTANGLEMENT, COMMUNICATION, 02 engineering and technology, Quantum entanglement, Data_CODINGANDINFORMATIONTHEORY, quantum networks, COMPUTATION, Entropy of entanglement, Topology, 01 natural sciences, Upper and lower bounds, quant-ph, quantum information, LINEAR OPTICS, KEY DISTRIBUTION, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, Entropy (information theory), quantum communication, Quantum information, 010306 general physics, Amplitude damping channel, Physics, Quantum Physics, Quantum network, Science & Technology, 02 Physical Sciences, PRIVATE, BROADCAST CHANNELS, TheoryofComputation_GENERAL, BELL THEOREM, 020206 networking & telecommunications, STATES, Qubit, Physical Sciences, Quantum Physics (quant-ph)

Abstract

We provide a versatile upper bound on the number of maximally entangled qubits, or private bits, shared by two parties via a generic adaptive communication protocol over a quantum network when the use of classical communication is not restricted. Although our result follows the idea of Azuma et al. [Nat. Comm. 7, 13523 (2016)] of splitting the network into two parts, our approach relaxes their strong restriction, consisting of the use of a single entanglement measure in the quantification of the maximum amount of entanglement generated by the channels. In particular, in our bound the measure can be chosen on a channel-by-channel basis, in order to make it as tight as possible. This enables us to apply the relative entropy of entanglement, which often gives a state-of-the-art upper bound, on every Choi-simulable channel in the network, even when the other channels do not satisfy this property. We also develop tools to compute, or bound, the max-relative entropy of entanglement for channels that are invariant under phase rotations. In particular, we present an analytical formula for the max-relative entropy of entanglement of the qubit amplitude damping channel., Comment: 23 + 14 pages, 6 figures, close to published version

Published

2017

15. Fundamental limitation on quantum broadcast networks

Author

Koji Azuma and Stefan Bäuml

Subjects

Repeater, Quantum Physics, Quantum network, Physics and Astronomy (miscellaneous), Computer science, Materials Science (miscellaneous), FOS: Physical sciences, 020206 networking & telecommunications, 02 engineering and technology, Quantum entanglement, Squashed entanglement, Topology, 01 natural sciences, Multipartite entanglement, Atomic and Molecular Physics, and Optics, Multipartite, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering, Bipartite graph, Electrical and Electronic Engineering, 010306 general physics, Quantum Physics (quant-ph), Quantum

Abstract

The ability to distribute entanglement over complex quantum networks is an important step towards a quantum internet. Recently, there has been significant theoretical effort, mainly focusing on the distribution of bipartite entanglement via a simple quantum network composed only of bipartite quantum channels. There are, however, a number of quantum information processing protocols based on multipartite rather than bipartite entanglement. Whereas multipartite entanglement can be distributed by means of a network of bipartite channels, a more natural way is to use a more general network, that is, a quantum broadcast network including quantum broadcast channels. In this work, we present a general frame- work for deriving upper bounds on the rates at which GHZ states or multipartite private states can be distributed among a number of different parties over an arbitrary quantum broadcast network. Our upper bounds are written in terms of the multipartite squashed entanglement, corresponding to a generalisation of recently derived bounds [K. Azuma et al., Nat. Commun. 7, 13523 (2016)]. We also discuss how lower bounds can be obtained by combining a generalisation of an aggregated quantum repeater protocol with graph theoretic concepts., Comment: 16 pages, 2 figures, published version

Published

2016

16. Witnessing entanglement by proxy

Author

Hermann Kampermann, Marcus Huber, Dagmar Bruß, Andreas Winter, and Stefan Bäuml

Subjects

Physics, Quantum Physics, Computation, Entropy, Complex system, General Physics and Astronomy, FOS: Physical sciences, Observable, Quantum entanglement, Quantum Hall effect, Entanglement, Grand canonical ensemble, Quantum state, Thermodynamics, Statistical physics, Quantum Physics (quant-ph), Quantum computer

Abstract

Entanglement is a ubiquitous feature of low temperature systems and believed to be highly relevant for the dynamics of condensed matter properties and quantum computation even at higher temperatures. The experimental certification of this paradigmatic quantum effect in macroscopic high temperature systems is constrained by the limited access to the quantum state of the system. In this paper we show how macroscopic observables beyond the energy of the system can be exploited as proxy witnesses for entanglement detection. Using linear and semi-definite relaxations we show that all previous approaches to this problem can be outperformed by our proxies, i.e. entanglement can be certified at higher temperatures without access to any local observable. For an efficient computation of proxy witnesses one can resort to a generalized grand canonical ensemble, enabling entanglement certification even in complex systems with macroscopic particle numbers., Comment: 22 pages, 8 figures

Published

2016

17. Fundamental limitation on quantum broadcast networks.

Author

Stefan Bäuml and Koji Azuma

Published

2017

18. Witnessing entanglement by proxy.

Author

Stefan Bäuml, Dagmar Bruß, Marcus Huber, Hermann Kampermann, and Andreas Winter

Subjects

*QUANTUM entanglement, *QUANTUM computing, *CONDENSED matter

Abstract

Entanglement is a ubiquitous feature of low temperature systems and believed to be highly relevant for the dynamics of condensed matter properties and quantum computation even at higher temperatures. The experimental certification of this paradigmatic quantum effect in macroscopic high temperature systems is constrained by the limited access to the quantum state of the system. In this paper we show how macroscopic observables beyond the mean energy of the system can be exploited as proxy witnesses for entanglement detection. Using linear and semi-definite relaxations we show that all previous approaches to this problem can be outperformed by our proxies, i.e. entanglement can be certified at higher temperatures without access to any local observable. For an efficient computation of proxy witnesses one can resort to a generalised grand canonical ensemble, enabling entanglement certification even in complex systems with macroscopic particle numbers. [ABSTRACT FROM AUTHOR]

Published

2016