Convergence conditions for the quantum relative entropy and other
applications of the deneralized quantum Dini lemma
- URL: http://arxiv.org/abs/2205.09108v2
- Date: Sun, 11 Dec 2022 12:30:37 GMT
- Title: Convergence conditions for the quantum relative entropy and other
applications of the deneralized quantum Dini lemma
- Authors: M.E.Shirokov
- Abstract summary: We prove two general dominated convergence theorems and the theorem about preserving local continuity under convex mixtures.
A simple convergence criterion for the von Neumann entropy is also obtained.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We describe a generalized version of the result called quantum Dini lemma
that was used previously for analysis of local continuity of basic correlation
and entanglement measures. The generalization consists in considering sequences
of functions instead of a single function. It allows us to expand the scope of
possible applications of the method. We prove two general dominated convergence
theorems and the theorem about preserving local continuity under convex
mixtures.
By using these theorems we obtain several convergence conditions for the
quantum relative entropy and for the mutual information of a quantum channel
considered as a function of a pair (channel, input state). A simple convergence
criterion for the von Neumann entropy is also obtained.
Related papers
- On average output entropy of a quantum channel [0.0]
A new useful metric on the set of generalized ensembles is proposed and explored.
The concept of passive energy of an ensemble introduced here plays an important role in the article.
arXiv Detail & Related papers (2024-04-11T17:57:20Z) - Dilation theorem via Schr\"odingerisation, with applications to the
quantum simulation of differential equations [29.171574903651283]
Nagy's unitary dilation theorem in operator theory asserts the possibility of dilating a contraction into a unitary operator.
In this study, we demonstrate the viability of the recently devised Schr"odingerisation approach.
arXiv Detail & Related papers (2023-09-28T08:55:43Z) - An entropic uncertainty principle for mixed states [0.0]
We provide a family of generalizations of the entropic uncertainty principle.
Results can be used to certify entanglement between trusted parties, or to bound the entanglement of a system with an untrusted environment.
arXiv Detail & Related papers (2023-03-20T18:31:53Z) - Entropy Uncertainty Relations and Strong Sub-additivity of Quantum
Channels [17.153903773911036]
We prove an entropic uncertainty relation for two quantum channels.
Motivated by Petz's algebraic SSA inequality, we also obtain a generalized SSA for quantum relative entropy.
arXiv Detail & Related papers (2023-01-20T02:34:31Z) - Asymptotic Equipartition Theorems in von Neumann algebras [24.1712628013996]
We show that the smooth max entropy of i.i.d. states on a von Neumann algebra has an rate given by the quantum relative entropy.
Our AEP not only applies to states, but also to quantum channels with appropriate restrictions.
arXiv Detail & Related papers (2022-12-30T13:42:35Z) - Integral formula for quantum relative entropy implies data processing
inequality [0.0]
We prove the monotonicity of quantum relative entropy under trace-preserving positive linear maps.
For a simple application of such monotonicities, we consider any divergence' that is non-increasing under quantum measurements.
An argument due to Hiai, Ohya, and Tsukada is used to show that the infimum of such a divergence' on pairs of quantum states with prescribed trace distance is the same as the corresponding infimum on pairs of binary classical states.
arXiv Detail & Related papers (2022-08-25T16:32:02Z) - Stochastic approximate state conversion for entanglement and general quantum resource theories [41.94295877935867]
An important problem in any quantum resource theory is to determine how quantum states can be converted into each other.
Very few results have been presented on the intermediate regime between probabilistic and approximate transformations.
We show that these bounds imply an upper bound on the rates for various classes of states under probabilistic transformations.
We also show that the deterministic version of the single copy bounds can be applied for drawing limitations on the manipulation of quantum channels.
arXiv Detail & Related papers (2021-11-24T17:29:43Z) - Experimental Validation of Fully Quantum Fluctuation Theorems Using
Dynamic Bayesian Networks [48.7576911714538]
Fluctuation theorems are fundamental extensions of the second law of thermodynamics for small systems.
We experimentally verify detailed and integral fully quantum fluctuation theorems for heat exchange using two quantum-correlated thermal spins-1/2 in a nuclear magnetic resonance setup.
arXiv Detail & Related papers (2020-12-11T12:55:17Z) - Theory of Ergodic Quantum Processes [0.0]
We consider general ergodic sequences of quantum channels with arbitrary correlations and non-negligible decoherence.
We compute the entanglement spectrum across any cut, by which the bipartite entanglement entropy can be computed exactly.
Other physical implications of our results are that most Floquet phases of matter are metastable and that noisy random circuits in the large depth limit will be trivial as far as their quantum entanglement is concerned.
arXiv Detail & Related papers (2020-04-29T18:00:03Z) - Quantum Statistical Complexity Measure as a Signalling of Correlation
Transitions [55.41644538483948]
We introduce a quantum version for the statistical complexity measure, in the context of quantum information theory, and use it as a signalling function of quantum order-disorder transitions.
We apply our measure to two exactly solvable Hamiltonian models, namely: the $1D$-Quantum Ising Model and the Heisenberg XXZ spin-$1/2$ chain.
We also compute this measure for one-qubit and two-qubit reduced states for the considered models, and analyse its behaviour across its quantum phase transitions for finite system sizes as well as in the thermodynamic limit by using Bethe ansatz.
arXiv Detail & Related papers (2020-02-05T00:45:21Z)
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.