Improving absolute separability bounds for arbitrary dimensions
- URL: http://arxiv.org/abs/2410.22415v1
- Date: Tue, 29 Oct 2024 18:00:04 GMT
- Title: Improving absolute separability bounds for arbitrary dimensions
- Authors: Jofre Abellanet-Vidal, Guillem Müller-Rigat, Grzegorz Rajchel-Mieldzioć, Anna Sanpera,
- Abstract summary: Sufficient analytical conditions for separability in composite quantum systems are very scarce and only known for low-dimensional cases.
We use linear maps and their inverses to derive powerful analytical conditions, providing tight bounds and extremal points of the set of absolutely separable states.
- Score: 0.0
- License:
- Abstract: Sufficient analytical conditions for separability in composite quantum systems are very scarce and only known for low-dimensional cases. Here, we use linear maps and their inverses to derive powerful analytical conditions, providing tight bounds and extremal points of the set of absolutely separable states, i.e., states that remain separable under any global unitary transformation. Our analytical results apply to generic quantum states in arbitrary dimensions, and depend only on a single or very few eigenvalues of the considered state. Furthermore, we use convex geometry tools to improve the general characterization of the AS set given several non-comparable criteria. Finally, we present various conditions related to the twin problem of characterizing absolute PPT, that is, the set of quantum states that are positive under partial transposition and remain so under all unitary transformations.
Related papers
- On the extreme points of sets of absolulely separable and PPT states [6.9607365816307]
The absolutely separable (resp. PPT) states remain separable (resp. positive partial transpose) under any global unitary operation.
We show that each extreme point has at most three distinct eigenvalues.
We also demonstrate that any extreme point in qutrit-qudit system has at most seven distinct eigenvalues.
arXiv Detail & Related papers (2024-09-22T07:17:25Z) - Absolute dimensionality of quantum ensembles [41.94295877935867]
The dimension of a quantum state is traditionally seen as the number of superposed distinguishable states in a given basis.
We propose an absolute, i.e.basis-independent, notion of dimensionality for ensembles of quantum states.
arXiv Detail & Related papers (2024-09-03T09:54:15Z) - Symmetry-restricted quantum circuits are still well-behaved [45.89137831674385]
We show that quantum circuits restricted by a symmetry inherit the properties of the whole special unitary group $SU(2n)$.
It extends prior work on symmetric states to the operators and shows that the operator space follows the same structure as the state space.
arXiv Detail & Related papers (2024-02-26T06:23:39Z) - Real quantum operations and state transformations [44.99833362998488]
Resource theory of imaginarity provides a useful framework to understand the role of complex numbers.
In the first part of this article, we study the properties of real'' (quantum) operations in single-party and bipartite settings.
In the second part of this article, we focus on the problem of single copy state transformation via real quantum operations.
arXiv Detail & Related papers (2022-10-28T01:08:16Z) - Improved Quantum Algorithms for Fidelity Estimation [77.34726150561087]
We develop new and efficient quantum algorithms for fidelity estimation with provable performance guarantees.
Our algorithms use advanced quantum linear algebra techniques, such as the quantum singular value transformation.
We prove that fidelity estimation to any non-trivial constant additive accuracy is hard in general.
arXiv Detail & Related papers (2022-03-30T02:02:16Z) - 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) - Attainability and lower semi-continuity of the relative entropy of
entanglement, and variations on the theme [8.37609145576126]
The relative entropy of entanglement $E_Rite is defined as the distance of a multi-part quantum entanglement from the set of separable states as measured by the quantum relative entropy.
We show that this state is always achieved, i.e. any state admits a closest separable state, even in dimensions; also, $E_Rite is everywhere lower semi-negative $lambda_$quasi-probability distribution.
arXiv Detail & Related papers (2021-05-17T18:03:02Z) - Approximation of multipartite quantum states and the relative entropy of
entanglement [0.0]
We prove several results about analytical properties of the multipartite relative entropy of entanglement and its regularization.
We establish a finite-dimensional approximation property for the relative entropy of entanglement and its regularization.
arXiv Detail & Related papers (2021-03-22T18:12:24Z) - Local and Global Uniform Convexity Conditions [88.3673525964507]
We review various characterizations of uniform convexity and smoothness on norm balls in finite-dimensional spaces.
We establish local versions of these conditions to provide sharper insights on a recent body of complexity results in learning theory, online learning, or offline optimization.
We conclude with some practical examples in optimization and machine learning where leveraging these conditions and localized assumptions lead to new complexity results.
arXiv Detail & Related papers (2021-02-09T21:09:53Z) - The face generated by a point, generalized affine constraints, and
quantum theory [0.0]
We show that by intersecting a convex set with a sublevel or level set of a generalized affine functional, the dimension of the face generated by a point may decrease by at most one.
We apply the results to the set of quantum states on a separable Hilbert space.
arXiv Detail & Related papers (2020-03-31T15:40:38Z) - Partial Traces and the Geometry of Entanglement; Sufficient Conditions
for the Separability of Gaussian States [0.0]
We put an emphasis on the geometrical properties of the covariance ellipsoids of the reduced states.
We give new and easily numerically implementable sufficient conditions for the separability of all Gaussian states.
arXiv Detail & Related papers (2020-03-30T02:22:08Z)
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.