Quantum channels and some absolute properties of quantum states
- URL: http://arxiv.org/abs/2304.00711v2
- Date: Wed, 5 Jun 2024 04:32:55 GMT
- Title: Quantum channels and some absolute properties of quantum states
- Authors: Tapaswini Patro, Kaushiki Mukherjee, Nirman Ganguly,
- Abstract summary: We probe the action of some quantum channels in two qubits and two qudits and find that some quantum states move from the non-absolute regime to the absolute regime under the action.
We extend the notion of absoluteness to conditional R'enyi entropies and find the required condition for a state to have absolute conditional R'enyi entropy non-negative (ACRENN) property.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Environmental interactions are ubiquitous in any real-world application of a quantum information processing protocol. Such interactions result in depletion of quantum resources. Two important figure of merits in the context of quantum information are the fully entangled fraction (FEF) and conditional entropy of a composite quantum system. FEF has a key role to play in tasks like teleportation. Conditional entropy on the other hand can be negative for certain quantum states and thus the negativity remains a resource for tasks like dense coding and state merging. FEF $ > 1/d $ for a $ d \otimes d $ quantum system is a significant threshold, however for some quantum states it remains less than the threshold even with global unitary operations, consequently being known as states having absolute fully entangled fraction (AFEF). Pertaining to conditional von Neumann entropy, there are some states which retains the nonnegativity of the conditional entropy under global unitary action, to be called as states with absolute conditional von Neumann entropy nonnegative (ACVENN) property. In the present submission, we probe the action of some quantum channels in two qubits and two qudits and find that some quantum states move from the non-absolute regime to the absolute regime under the action. Since, global unitary operations are unable to retrieve them back to the non-absolute regime, we provide a prescription for the retrieval using an entanglement swapping network. Furthermore, we extend the notion of absoluteness to conditional R\'enyi entropies and find the required condition for a state to have absolute conditional R\'enyi entropy non-negative (ACRENN) property. We then extend the work to include the marginals of a tripartite system and provide for their characterization with respect to the aforementioned absolute properties.
Related papers
- Quantum conditional entropies and fully entangled fraction of states with maximally mixed marginals [0.0]
The fully entangled fraction (FEF) measures the proximity of a quantum state to maximally entangled states.
Quantum conditional entropy (QCE) is a measure of correlation in quantum systems.
FEF is intricately linked with $k$- copy nonlocality and $k$- copy steerability.
arXiv Detail & Related papers (2024-08-05T06:16:51Z) - Critical Fermions are Universal Embezzlers [44.99833362998488]
We show that universal embezzlers are ubiquitous in many-body physics.
The same property holds in locally-interacting, dual spin chains via the Jordan-Wigner transformation.
arXiv Detail & Related papers (2024-06-17T17:03:41Z) - Second Law of Entanglement Manipulation with Entanglement Battery [41.94295877935867]
A central question since the beginning of quantum information science is how two distant parties can convert one entangled state into another.
It has been conjectured that entangled state transformations could be executed reversibly in an regime, mirroring the nature of Carnot cycles in classical thermodynamics.
We investigate the concept of an entanglement battery, an auxiliary quantum system that facilitates quantum state transformations without a net loss of entanglement.
arXiv Detail & Related papers (2024-05-17T07:55:04Z) - Embezzling entanglement from quantum fields [41.94295877935867]
Embezzlement of entanglement refers to the counterintuitive possibility of extracting entangled quantum states from a reference state of an auxiliary system.
We uncover a deep connection between the operational task of embezzling entanglement and the mathematical classification of von Neumann algebras.
arXiv Detail & Related papers (2024-01-14T13:58:32Z) - The power of noisy quantum states and the advantage of resource dilution [62.997667081978825]
Entanglement distillation allows to convert noisy quantum states into singlets.
We show that entanglement dilution can increase the resilience of shared quantum states to local noise.
arXiv Detail & Related papers (2022-10-25T17:39:29Z) - Unconventional mechanism of virtual-state population through dissipation [125.99533416395765]
We report a phenomenon occurring in open quantum systems by which virtual states can acquire a sizable population in the long time limit.
This means that the situation where the virtual state remains unpopulated can be metastable.
We show how these results can be relevant for practical questions such as the generation of stable and metastable entangled states in dissipative systems of interacting qubits.
arXiv Detail & Related papers (2022-02-24T17:09:43Z) - Quantum conditional entropy from information-theoretic principles [10.674604700001966]
We show that any quantum conditional entropy must be negative on certain entangled states and must equal -log(d) on dxd maximally entangled states.
We also prove the non-negativity of conditional entropy on separable states, and we provide a generic definition for the dual of a quantum conditional entropy.
arXiv Detail & Related papers (2021-10-28T17:44:54Z) - On quantum states with a finite-dimensional approximation property [0.0]
We consider a class of quantum states containing finite rank states containing infinite rank states with the sufficient rate decreasing of eigenvalues.
We show that this property implies finiteness of the entropy von Neumann entropy but unsolved the question concerning the converse implication.
We establish the uniform continuity of the above characteristics as functions of a channel w.r.t.
arXiv Detail & Related papers (2021-03-17T13:15:04Z) - Catalytic Transformations of Pure Entangled States [62.997667081978825]
Entanglement entropy is the von Neumann entropy of quantum entanglement of pure states.
The relation between entanglement entropy and entanglement distillation has been known only for the setting, and the meaning of entanglement entropy in the single-copy regime has so far remained open.
Our results imply that entanglement entropy quantifies the amount of entanglement available in a bipartite pure state to be used for quantum information processing, giving results an operational meaning also in entangled single-copy setup.
arXiv Detail & Related papers (2021-02-22T16:05:01Z) - Witnessing Negative Conditional Entropy [0.0]
We prove the existence of a Hermitian operator for the detection of states having negative conditional entropy for bipartite systems.
We find that for a particular witness, the estimated tight upper bound matches the value of conditional entropy for Werner states.
arXiv Detail & Related papers (2020-01-30T10:08:10Z) - On lower semicontinuity of the quantum conditional mutual information
and its corollaries [0.0]
We show that the recently established lower semicontinuity of the quantum conditional mutual information implies (in fact) the lower semicontinuity of the loss of the quantum (conditional) mutual information under local channels.
New continuity conditions for the quantum mutual information and for the squashed entanglement in both bipartite and multipartite infinite-dimensional systems are obtained.
arXiv Detail & Related papers (2020-01-23T17:34:54Z)
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.