Related papers: Linear maps as sufficient criteria for entanglement depth and compatibility in many-body systems

Linear maps as sufficient criteria for entanglement depth and compatibility in many-body systems

URL: http://arxiv.org/abs/2211.02871v2
Date: Sun, 8 Jan 2023 18:30:48 GMT
Title: Linear maps as sufficient criteria for entanglement depth and compatibility in many-body systems
Authors: Maciej Lewenstein, Guillem M\"uller-Rigat, Jordi Tura, Anna Sanpera
Abstract summary: We extend results presented in [Phys. Rev A 93, 042335], where sufficient separability criteria for bipartite systems were derived. We derive criteria to detect arbitrary $(N-n)$-entanglement depth tailored to states in close vicinity of the completely depolarized state. We also provide separability (or $1$- entanglement depth) conditions in the symmetric sector, including for diagonal states.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Physical transformations are described by linear maps that are completely positive and trace preserving (CPTP). However, maps that are positive (P) but not completely positive (CP) are instrumental to derive separability/entanglement criteria. Moreover, the properties of such maps can be linked to entanglement properties of the states they detect. Here, we extend the results presented in [Phys. Rev A 93, 042335 (2016)], where sufficient separability criteria for bipartite systems were derived. In particular, we analyze the entanglement depth of an $N$-qubit system by proposing linear maps that, when applied to any state, result in a bi-separable state for the $1:(N-1)$ partitions, i.e., $(N-1)$-entanglement depth. Furthermore, we derive criteria to detect arbitrary $(N-n)$-entanglement depth tailored to states in close vicinity of the completely depolarized state (the normalized identity matrix). We also provide separability (or $1$- entanglement depth) conditions in the symmetric sector, including for diagonal states. Finally, we suggest how similar map techniques can be used to derive sufficient conditions for a set of expectation values to be compatible with separable states or local-hidden-variable theories. We dedicate this paper to the memory of the late Andrzej Kossakowski, our spiritual and intellectual mentor in the field of linear maps.

Related papers

$su(d)$-squeezing and many-body entanglement geometry in finite-dimensional systems [0.0]
Generalizing the well-known spin-squeezing inequalities, we study the relation between squeezing of collective $N$-particle $su(d)$ operators and many-body entanglement geometry in multi-particle systems.
arXiv Detail & Related papers (2024-06-19T08:40:11Z)
Learning with Norm Constrained, Over-parameterized, Two-layer Neural Networks [54.177130905659155]
Recent studies show that a reproducing kernel Hilbert space (RKHS) is not a suitable space to model functions by neural networks. In this paper, we study a suitable function space for over- parameterized two-layer neural networks with bounded norms.
arXiv Detail & Related papers (2024-04-29T15:04:07Z)
Geometry of degenerate quantum states, configurations of $m$-planes and invariants on complex Grassmannians [55.2480439325792]
We show how to reduce the geometry of degenerate states to the non-abelian connection $A$. We find independent invariants associated with each triple of subspaces. Some of them generalize the Berry-Pancharatnam phase, and some do not have analogues for 1-dimensional subspaces.
arXiv Detail & Related papers (2024-04-04T06:39:28Z)
Physical realization of realignment criteria using structural physical approximation [0.0]
Entanglement detection is an important problem in quantum information theory. Realignment criteria is a powerful tool for detection of entangled states in bipartite and multipartite quantum system.
arXiv Detail & Related papers (2023-01-24T09:41:33Z)
Bound Entanglement of Bell Diagonal Pairs of Qutrits and Ququarts: A Comparison [0.06091702876917279]
We classify Bell diagonal bipartite qudits with positive partial transposition (PPT) as entangled or separable. We estimate the volumes of separable and free and bound entangled states.
arXiv Detail & Related papers (2022-09-30T06:58:27Z)
Near-optimal estimation of smooth transport maps with kernel sums-of-squares [81.02564078640275]
Under smoothness conditions, the squared Wasserstein distance between two distributions could be efficiently computed with appealing statistical error upper bounds. The object of interest for applications such as generative modeling is the underlying optimal transport map. We propose the first tractable algorithm for which the statistical $L2$ error on the maps nearly matches the existing minimax lower-bounds for smooth map estimation.
arXiv Detail & Related papers (2021-12-03T13:45:36Z)
Annihilating Entanglement Between Cones [77.34726150561087]
We show that Lorentz cones are the only cones with a symmetric base for which a certain stronger version of the resilience property is satisfied. Our proof exploits the symmetries of the Lorentz cones and applies two constructions resembling protocols for entanglement distillation.
arXiv Detail & Related papers (2021-10-22T15:02:39Z)
Guaranteeing Completely Positive Quantum Evolution [2.578242050187029]
We transform an initial NCP map to a CP map through composition with the asymmetric depolarizing map. We prove that the composition can always be made CP without completely depolarizing in any direction. We show that asymmetric depolarization has many advantages over SPA in preserving the structure of the original NCP map.
arXiv Detail & Related papers (2021-04-30T20:53:19Z)
Scattering data and bound states of a squeezed double-layer structure [77.34726150561087]
A structure composed of two parallel homogeneous layers is studied in the limit as their widths $l_j$ and $l_j$, and the distance between them $r$ shrinks to zero simultaneously. The existence of non-trivial bound states is proven in the squeezing limit, including the particular example of the squeezed potential in the form of the derivative of Dirac's delta function. The scenario how a single bound state survives in the squeezed system from a finite number of bound states in the finite system is described in detail.
arXiv Detail & Related papers (2020-11-23T14:40:27Z)
Generating and detecting bound entanglement in two-qutrits using a family of indecomposable positive maps [0.0]
We propose an indecomposable positive map for two-qutrit systems. A corresponding witness operator is constructed and shown to be weakly optimal. We find a new entangled state which is not detectable by certain other well-known entanglement detection criteria.
arXiv Detail & Related papers (2020-08-29T12:52:27Z)
Anisotropy-mediated reentrant localization [62.997667081978825]
We consider a 2d dipolar system, $d=2$, with the generalized dipole-dipole interaction $sim r-a$, and the power $a$ controlled experimentally in trapped-ion or Rydberg-atom systems. We show that the spatially homogeneous tilt $beta$ of the dipoles giving rise to the anisotropic dipole exchange leads to the non-trivial reentrant localization beyond the locator expansion.
arXiv Detail & Related papers (2020-01-31T19:00:01Z)

This list is automatically generated from the titles and abstracts of the papers in this site.