Your search keyword '"Roga, W"' showing total 13 results

1. Geometric measures of quantum correlations with Bures and Hellinger distances

Author

Spehner, D., Illuminati, F., Orszag, M., and Roga, W.

Subjects

Quantum Physics

Abstract

This article contains a survey of the geometric approach to quantum correlations. We focus mainly on the geometric measures of quantum correlations based on the Bures and quantum Hellinger distances., Comment: to be published as a chapter of the book "Lectures on general quantum correlations and their applications" edited by F. Fanchini, D. Soares-Pinto, and G. Adesso (Springer, 2017); 47 pages, 3 figures; second version: minor typos in the first version corrected

Published

2016

2. Classical nature of ordered quantum phases and origin of spontaneous symmetry breaking

Author

Cianciaruso, M., Giampaolo, S. M., Ferro, L., Roga, W., Zonzo, G., Blasone, M., and Illuminati, F.

Subjects

Condensed Matter - Statistical Mechanics, Mathematical Physics, Quantum Physics

Abstract

We analyse the nature of spontaneous symmetry breaking in complex quantum systems by investigating the long-standing conjecture that the maximally symmetry-breaking quantum ground states are the most classical ones corresponding to a globally ordered phase. We make this argument quantitatively precise by comparing different local and global indicators of classicality and quantumness, respectively in symmetry-breaking and symmetry-preserving quantum ground states. We first discuss how naively comparing local, pairwise entanglement and discord apparently leads to the opposite conclusion. Indeed, we show that in symmetry-preserving ground states the two-body entanglement captures only a modest portion of the total two-body quantum correlations, while, on the contrary, in maximally symmetry-breaking ground states it contributes the largest amount to the total two-body quantum correlations. We then put to test the conjecture by looking at the global, macroscopic correlation properties of quantum ground states. We prove that the ground states which realize the maximum breaking of the Hamiltonian symmetries, associated to a globally ordered phase, are the only ones that: I) are always locally convertible, i.e. can be obtained from all other ground states by only applying LOCC transformations (local operations and classical communication), while the reverse is never possible; II) minimize the monogamy inequality on the globally shared, macroscopic bipartite entanglement., Comment: 9 pagese, 6 figures. The present submission updates and supersedes our previous preprints arXiv:1408.1412 and arXiv:1412.1054

Published

2016

3. Entanglement and quantum correlations in many-body systems: a unified approach via local unitary operations

Author

Cianciaruso, M., Giampaolo, S. M., Roga, W., Zonzo, G., Blasone, M., and Illuminati, F.

Subjects

Quantum Physics, Condensed Matter - Statistical Mechanics

Abstract

Local unitary operations allow for a unifying approach to the quantification of quantum correlations among the constituents of a bipartite quantum system. For pure states, the distance between a given state and its image under least-perturbing local unitary operations is a bona fide measure of quantum entanglement, the so-called entanglement of response, which can be extended to mixed states via the convex roof construction. On the other hand, when defined directly on mixed states perturbed by local unitary operations, such a distance turns out to be a bona fide measure of quantum correlations, the so-called discord of response. Exploiting this unified framework, we perform a detailed comparison between two-body entanglement and two-body quantum discord in infinite XY quantum spin chains both in symmetry-preserving and symmetry-breaking ground states as well as in thermal states at finite temperature. The results of the investigation show that in symmetry-preserving ground states the two-point quantum discord dominates over the two-point entanglement, while in symmetrybreaking ground states the two-point quantum discord is strongly suppressed and the two-point entanglement is essentially unchanged. In thermal states, for certain regimes of Hamiltonian parameters, we show that the pairwise quantum discord and the pairwise entanglement can increase with increasing thermal fluctuations., Comment: 10 pages, 12 figures. Submitted to Phys. Rev. A

Published

2014

4. Discord of response

Author

Roga, W., Giampaolo, S. M., and Illuminati, F.

Subjects

Quantum Physics, Condensed Matter - Statistical Mechanics

Abstract

The presence of quantum correlations in a quantum state is related to the state response to local unitary perturbations. Such response is quantified by the distance between the unperturbed and perturbed states, minimized with respect to suitably identified sets of local unitary operations. In order to be a bona fide measure of quantum correlations, the distance function must be chosen among those that are contractive under completely positive and trace preserving maps. The most relevant instances of such physically well behaved metrics include the trace, the Bures, and the Hellinger distance. To each of these metrics one can associate the corresponding discord of response, namely the trace, or Hellinger, or Bures minimum distance from the set of unitarily perturbed states. All these three discords of response satisfy the basic axioms for a proper measure of quantum correlations. In the present work we focus in particular on the Bures distance, which enjoys the unique property of being both Riemannian and contractive under completely positive and trace preserving maps, and admits important operational interpretations in terms of state distinguishability. We compute analytically the Bures discord of response for two-qubit states with maximally mixed marginals and we compare it with the corresponding Bures geometric discord, namely the geometric measure of quantum correlations defined as the Bures distance from the set of classically correlated quantum states. Finally, we investigate and identify the maximally quantum correlated two-qubit states according to the Bures discord of response. These states exhibit a remarkable nonlinear dependence on the global state purity., Comment: 10 pages, 2 figures. Improved and expanded version, to be published in J. Phys. A: Math. Gen

Published

2014

5. Quantifying nonclassicality: global impact of local unitary evolutions

Author

Giampaolo, S. M., Streltsov, A., Roga, W., Bruß, D., and Illuminati, F.

Subjects

Quantum Physics, Condensed Matter - Other Condensed Matter, High Energy Physics - Theory, Mathematical Physics

Abstract

We show that only those composite quantum systems possessing nonvanishing quantum correlations have the property that any nontrivial local unitary evolution changes their global state. We derive the exact relation between the global state change induced by local unitary evolutions and the amount of quantum correlations. We prove that the minimal change coincides with the geometric measure of discord (defined via the Hilbert- Schmidt norm), thus providing the latter with an operational interpretation in terms of the capability of a local unitary dynamics to modify a global state. We establish that two-qubit Werner states are maximally quantum correlated, and are thus the ones that maximize this type of global quantum effect. Finally, we show that similar results hold when replacing the Hilbert-Schmidt norm with the trace norm., Comment: 5 pages, 1 figure. To appear in Physical Review A

Published

2012

6. Device-independent quantum reading and noise-assisted quantum transmitters

Author

Roga, W, primary, Buono, D, additional, and Illuminati, F, additional

Published

2015

7. Matrices if fidelities for ensembles of quantum states and the Holevo quantity

Author

Fannes, M., Melo, F. (Fernando) de, Roga, W., Zyczkowski, K., Fannes, M., Melo, F. (Fernando) de, Roga, W., and Zyczkowski, K.

Published

2012

8. Acta Physica Polonica B

Author

Roga, W., primary, Smaczyński, M., additional, and Życzkowski, K., additional

Published

2011

9. Universal freezing of quantum correlations within the geometric approach

Author

Rosario Lo Franco, Thomas R. Bromley, Wojciech Roga, Gerardo Adesso, Marco Cianciaruso, Cianciaruso, M, Bromley, T R, Roga, W, Lo Franco, R, and Adesso, G

Subjects

Settore FIS/02 - Fisica Teorica, Modelli E Metodi Matematici, FOS: Physical sciences, Quantum entanglement, Article, Convexity, Information theory and computation, Qubits, Quantum information, Open quantum systems, quantum correlations, Statistical physics, QA, Quantum, QC, Condensed Matter - Statistical Mechanics, Mathematical Physics, Physics, Quantum Physics, Multidisciplinary, Statistical Mechanics (cond-mat.stat-mech), Probability and statistics, State (functional analysis), Mathematical Physics (math-ph), Quantum technology, Physics - Data Analysis, Statistics and Probability, Qubit, Constant (mathematics), Quantum Physics (quant-ph), Data Analysis, Statistics and Probability (physics.data-an)

Abstract

Quantum correlations in a composite system can be measured by resorting to a geometric approach, according to which the distance from the state of the system to a suitable set of classically correlated states is considered. Here we show that all distance functions, which respect natural assumptions of invariance under transposition, convexity, and contractivity under quantum channels, give rise to geometric quantifiers of quantum correlations which exhibit the peculiar freezing phenomenon, i.e., remain constant during the evolution of a paradigmatic class of states of two qubits each independently interacting with a non-dissipative decohering environment. Our results demonstrate from first principles that freezing of geometric quantum correlations is independent of the adopted distance and therefore universal. This finding paves the way to a deeper physical interpretation and future practical exploitation of the phenomenon for noisy quantum technologies., Comment: 18 pages, 2 figures. To appear in Nature Scientific Reports

Published

2014

10. Gaussian state-based quantum illumination with simple photodetection.

Author

Yang H, Roga W, Pritchard JD, and Jeffers J

Abstract

Proofs of the quantum advantage available in imaging or detecting objects under quantum illumination can rely on optimal measurements without specifying what they are. We use the continuous-variable Gaussian quantum information formalism to show that quantum illumination is better for object detection compared with coherent states of the same mean photon number, even for simple direct photodetection. The advantage persists if signal energy and object reflectivity are low and background thermal noise is high. The advantage is even greater if we match signal beam detection probabilities rather than mean photon number. We perform all calculations with thermal states, even for non-Gaussian conditioned states with negative Wigner functions. We simulate repeated detection using a Monte-Carlo process that clearly shows the advantages obtainable.

Published

2021

11. Compact multispectral pushframe camera for nanosatellites.

Author

Noblet Y, Bennett S, Griffin PF, Murray P, Marshall S, Roga W, Jeffers J, and Oi D

Abstract

In this paper we present an evolution of the single-pixel camera architecture, called "pushframe," which addresses the limitations of pushbroom cameras in space-based applications. In particular, it is well-suited to observing fast-moving scenes while retaining high spatial resolution and sensitivity. We show that the system is capable of producing color images with good fidelity and scalable resolution performance. The principle of our design broadens the choice of spectral ranges that can be captured, making it suitable for wide spectral ranges of infrared imaging.

Published

2020

12. Classical simulation of boson sampling with sparse output.

Author

Roga W and Takeoka M

Abstract

Boson sampling can simulate physical problems for which classical simulations are inefficient. However, not all problems simulated by boson sampling are classically intractable. We show explicit classical methods of finding boson sampling distributions when they are known to be highly sparse. In the methods, we first determine a few distributions from restricted number of detectors and then recover the full one using compressive sensing techniques. In general, the latter step could be of high complexity. However, we show that this problem can be reduced to solving an Ising model which under certain conditions can be done in polynomial time. Various extensions are discussed including a version involving quantum annealing. Hence, our results impact the understanding of the class of classically calculable problems. We indicate that boson samplers may be advantageous in dealing with problems which are not highly sparse. Finally, we suggest a hybrid method for problems of intermediate sparsity.

Published

2020

13. Universal freezing of quantum correlations within the geometric approach.

Author

Cianciaruso M, Bromley TR, Roga W, Lo Franco R, and Adesso G

Abstract

Quantum correlations in a composite system can be measured by resorting to a geometric approach, according to which the distance from the state of the system to a suitable set of classically correlated states is considered. Here we show that all distance functions, which respect natural assumptions of invariance under transposition, convexity, and contractivity under quantum channels, give rise to geometric quantifiers of quantum correlations which exhibit the peculiar freezing phenomenon, i.e., remain constant during the evolution of a paradigmatic class of states of two qubits each independently interacting with a non-dissipative decohering environment. Our results demonstrate from first principles that freezing of geometric quantum correlations is independent of the adopted distance and therefore universal. This finding paves the way to a deeper physical interpretation and future practical exploitation of the phenomenon for noisy quantum technologies.

Published

2015