Related papers: Tripartite entanglement of qudits

Tripartite entanglement of qudits

URL: http://arxiv.org/abs/2412.10728v1
Date: Sat, 14 Dec 2024 07:55:41 GMT
Title: Tripartite entanglement of qudits
Authors: Roman V. Buniy, Thomas W. Kephart,
Abstract summary: We provide an in-depth study of tripartite entanglement of qudits. We show how the decomposition theorem allows computations of invariants for compounded classes. We conclude with numerous examples of building classes for higher-spin qudits.
Score: 0.0
License:
Abstract: We provide an in-depth study of tripartite entanglement of qudits. We start with a short review of tripartite entanglement invariants, prove a theorem about the complete list of all allowed values of three (out of the total of four) such invariants, and give several bounds on the allowed values of the fourth invariant. After introducing several operations on entangled states (that allow us to build new states from old states) and deriving general properties pertaining to their invariants, we arrive at the decomposition theorem as one of our main results. The theorem relates the algebraic invariants of any entanglement class with the invariants of its corresponding components in each of its direct sum decompositions. This naturally leads to the definition of reducible and irreducible entanglement classes. We explicitly compute algebraic invariants for several families of irreducible classes and show how the decomposition theorem allows computations of invariants for compounded classes to be carried out efficiently. This theorem also allows us to compute the invariants for the infinite number of entanglement classes constructed from irreducible components. We proceed with the complete list of the entanglement classes for three tribits with decompositions of each class into irreducible components, and provide a visual guide to interrelations of these decompositions. We conclude with numerous examples of building classes for higher-spin qudits.

Related papers

Discovering modular solutions that generalize compositionally [55.46688816816882]
We show that identification up to linear transformation purely from demonstrations is possible without having to learn an exponential number of module combinations. We further demonstrate empirically that meta-learning from finite data can discover modular policies that generalize compositionally in a number of complex environments.
arXiv Detail & Related papers (2023-12-22T16:33:50Z)
Geometry of Linear Neural Networks: Equivariance and Invariance under Permutation Groups [1.8434042562191815]
We investigate the subvariety of functions that are equivariant or invariant under the action of a permutation group. We draw conclusions for the parameterization and the design of equivariant and invariant linear networks.
arXiv Detail & Related papers (2023-09-24T19:40:15Z)
Effective Rationality for Local Unitary Invariants of Mixed States of Two Qubits [0.0]
We calculate the field of rational local unitary invariants for mixed states of two qubits. We prove that this field is rational (i.e. purely transcendental) We also prove similar statements for the local unitary invariants of symmetric mixed states of two qubits.
arXiv Detail & Related papers (2023-05-25T15:35:34Z)
Unextendibility, uncompletability, and many-copy indistinguishable ensembles [77.34726150561087]
We study unextendibility, uncompletability and analyze their connections to many-copy indistinguishable ensembles. We report a class of multipartite many-copy indistinguishable ensembles for which local indistinguishability property increases with decreasing mixedness.
arXiv Detail & Related papers (2023-03-30T16:16:41Z)
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)
Capacity of Group-invariant Linear Readouts from Equivariant Representations: How Many Objects can be Linearly Classified Under All Possible Views? [21.06669693699965]
We find that the fraction of separable dichotomies is determined by the dimension of the space that is fixed by the group action. We show how this relation extends to operations such as convolutions, element-wise nonlinearities, and global and local pooling.
arXiv Detail & Related papers (2021-10-14T15:46:53Z)
Polynomial decompositions with invariance and positivity inspired by tensors [1.433758865948252]
This framework has been recently introduced for tensor decompositions, in particular for quantum many-body systems. We define invariant decompositions of structures, approximations, and undecidability to reals. Our work sheds new light on footings by putting them on an equal footing with tensors, and opens the door to extending this framework to other product structures.
arXiv Detail & Related papers (2021-09-14T13:30:50Z)
Learning Algebraic Recombination for Compositional Generalization [71.78771157219428]
We propose LeAR, an end-to-end neural model to learn algebraic recombination for compositional generalization. Key insight is to model the semantic parsing task as a homomorphism between a latent syntactic algebra and a semantic algebra. Experiments on two realistic and comprehensive compositional generalization demonstrate the effectiveness of our model.
arXiv Detail & Related papers (2021-07-14T07:23:46Z)
GroupifyVAE: from Group-based Definition to VAE-based Unsupervised Representation Disentanglement [91.9003001845855]
VAE-based unsupervised disentanglement can not be achieved without introducing other inductive bias. We address VAE-based unsupervised disentanglement by leveraging the constraints derived from the Group Theory based definition as the non-probabilistic inductive bias. We train 1800 models covering the most prominent VAE-based models on five datasets to verify the effectiveness of our method.
arXiv Detail & Related papers (2021-02-20T09:49:51Z)
A refinement of Reznick's Positivstellensatz with applications to quantum information theory [72.8349503901712]
In Hilbert's 17th problem Artin showed that any positive definite in several variables can be written as the quotient of two sums of squares. Reznick showed that the denominator in Artin's result can always be chosen as an $N$-th power of the squared norm of the variables.
arXiv Detail & Related papers (2019-09-04T11:46:26Z)
Matrix integrals over unitary groups: An application of Schur-Weyl duality [4.927579219242575]
The integral formulae pertaining to the unitary group $mathsfU(d)$ have been comprehensively reviewed. Schur-Weyl duality serves as a bridge, establishing a profound connection between the representation theory of finite groups and that of classical Lie groups.
arXiv Detail & Related papers (2014-08-17T00:50:36Z)

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