Related papers: Two-parameter bipartite entanglement measure

Two-parameter bipartite entanglement measure

URL: http://arxiv.org/abs/2601.22568v1
Date: Fri, 30 Jan 2026 05:09:31 GMT
Title: Two-parameter bipartite entanglement measure
Authors: Chen-Ming Bai, Yu Luo,
Abstract summary: Entanglement concurrence is an important bipartite entanglement measure that has found wide applications in quantum technologies.<n>We introduce a two- parameter family of entanglement measures, referred to as the unified $(q,s)$-concurrence.<n>Explicit expressions are obtained for the unified $(q,s)$-concurrence in the cases of isotropic and Werner states.
Score: 4.908885505207505
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Entanglement concurrence is an important bipartite entanglement measure that has found wide applications in quantum technologies. In this work, inspired by unified entropy, we introduce a two-parameter family of entanglement measures, referred to as the unified $(q,s)$-concurrence. Both the standard entanglement concurrence and the recently proposed $q$-concurrence emerge as special cases within this family. By combining the positive partial transposition and realignment criteria, we derive an analytical lower bound for this measure for arbitrary bipartite mixed states, revealing a connection to strong separability criteria. Explicit expressions are obtained for the unified $(q,s)$-concurrence in the cases of isotropic and Werner states under the constraint $q>1$ and $qs\geq 1$. Furthermore, we explore the monogamy properties of the unified $(q,s)$-concurrence for $q\geq 2$, $0\leq s\leq 1$ and $1\leq qs\leq 3$, in qubit systems. In addition, we derive an entanglement polygon inequality for the unified $(q,s)$-concurrence with $q\geq 1$ and $qs\geq 1$, which manifests the relationship among all the marginal entanglements in any multipartite qudit system.

Related papers

A new entanglement measure based on the total concurrence [2.003078340059495]
A bona fide measure of quantum entanglement is introduced, the $mathcalCt_q$-concurrence ($q geq 2$)<n>An analytical expression is derived for the $mathcalCt_q$-concurrence in the cases of isotropic and Werner states.<n>The monogamy relations that the $mathcalCt_q$-concurrence satisfies for qubit systems are examined.
arXiv Detail & Related papers (2025-12-30T07:58:55Z)
Characterizing entanglement shareability and distribution in $N$-partite systems [2.1540014385373847]
We show that the square of bipartite entanglement measures $G_q$-concurrence.<n>We also show an analytical relation between $G_q$-concurrence and concurrence in $2otimes d systems.
arXiv Detail & Related papers (2025-12-17T02:17:45Z)
Non-representable quantum measures [55.2480439325792]
Grade-$d$ measures on a $sigma$-algebra $mathcalAsubseteq 2X$ over a set $X$ are generalizations of measures satisfying one of a hierarchy of weak additivity-type conditions.<n>Every signed polymeasure $lambda$ on $(X,mathcalA)d$ produces a grade-$d$ measure as its diagonal $widetildelambda(A):=lambda(A,cdots,A)$.
arXiv Detail & Related papers (2025-08-20T00:47:24Z)
Mesoscopic Fluctuations and Multifractality at and across Measurement-Induced Phase Transition [46.176861415532095]
We explore statistical fluctuations over the ensemble of quantum trajectories in a model of two-dimensional free fermions.<n>Our results exhibit a remarkable analogy to Anderson localization, with $G_AB$ corresponding to two-terminal conductance.<n>Our findings lay the groundwork for mesoscopic theory of monitored systems, paving the way for various extensions.
arXiv Detail & Related papers (2025-07-15T13:44:14Z)
Practical Criteria for Entanglement and Nonlocality in Systems with Additive Observables [44.99833362998488]
For general bipartite mixed states, a sufficient and necessary mathematical condition for certifying entanglement and/or (Bell) non-locality remains unknown.<n>We derive very simple, handy criteria for detecting entanglement or non-locality in many cases.<n>We illustrate these results by analyzing the potential detection of entanglement and nonlocality in Higgs to ZZ decays at the LHC.
arXiv Detail & Related papers (2025-03-21T16:48:04Z)
G_q-concurrence and entanglement constraints in multiqubit systems [2.150800093140658]
We show that $G_q$-concurrence satisfies all the axiomatic conditions of an entanglement measure and can be considered as a generalization of concurrence. We construct a set of entanglement indicators that can detect genuinely multiqubit entangled states even when the tangle loses its efficacy.
arXiv Detail & Related papers (2024-06-27T11:07:51Z)
Quantifying multipartite quantum states by ($k+1$)-partite entanglement measures [2.150800093140658]
We put forward two families of entanglement measures termed $q$-$(k+1)$-PE concurrence $(q>1)$ and $alpha$-$(k+1)$-PE concurrence $(0leqalpha1)$. We also propose two alternative kinds of entanglement measures, named $q$-$(k+1)$-GPE concurrence $(q>1)$ and $alpha$-$(k+1)$-GPE concurrence $(0leqalpha1)$.
arXiv Detail & Related papers (2024-04-23T13:19:17Z)
Entanglement hierarchies in multipartite scenarios [2.150800093140658]
We present a whole set of hierarchical quantifications as a method of characterizing quantum states. We show that $k$-GM concurrence can unambiguously classify entangled states into $(n-1)$ distinct classes. In particular, $alpha$-$-GM concurrence $(0alpha1)$ determines that the GHZ state and the $W$ state belong to the same hierarchy.
arXiv Detail & Related papers (2024-01-02T04:00:57Z)
Parameterized multipartite entanglement measures [2.4172837625375]
We present two types of entanglement measures in $n$-partite systems, $q$-$k$-ME concurrence $(qgeq2,2leq kleq n)$ and $alpha$-$k$-ME concurrence $(0leqalphaleqfrac12,2leq kleq n)$. Rigorous proofs show that the proposed $k$-nonseparable measures satisfy all the requirements for being an entanglement measure.
arXiv Detail & Related papers (2023-08-31T01:58:47Z)
Algebraic Aspects of Boundaries in the Kitaev Quantum Double Model [77.34726150561087]
We provide a systematic treatment of boundaries based on subgroups $Ksubseteq G$ with the Kitaev quantum double $D(G)$ model in the bulk. The boundary sites are representations of a $*$-subalgebra $Xisubseteq D(G)$ and we explicate its structure as a strong $*$-quasi-Hopf algebra. As an application of our treatment, we study patches with boundaries based on $K=G$ horizontally and $K=e$ vertically and show how these could be used in a quantum computer
arXiv Detail & Related papers (2022-08-12T15:05:07Z)
Some Remarks on the Regularized Hamiltonian for Three Bosons with Contact Interactions [77.34726150561087]
We discuss some properties of a model Hamiltonian for a system of three bosons interacting via zero-range forces in three dimensions. In particular, starting from a suitable quadratic form $Q$, the self-adjoint and bounded from below Hamiltonian $mathcal H$ can be constructed. We show that the threshold value $gamma_c$ is optimal, in the sense that the quadratic form $Q$ is unbounded from below if $gammagamma_c$.
arXiv Detail & Related papers (2022-07-01T10:01:14Z)
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)
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)

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