Related papers: Frame representations of qudit quantum mechanics

Frame representations of qudit quantum mechanics

URL: http://arxiv.org/abs/2305.19287v9
Date: Mon, 5 Feb 2024 19:00:45 GMT
Title: Frame representations of qudit quantum mechanics
Authors: Nicolae Cotfas
Abstract summary: We present several versions of Wigner function for qudits. Based on the concept of tight frame we present is finite, but it has certain properties and applications similar to those of continuous versions.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: There exist many attempts to define a Wigner function for qudits, each of them coming with its advantages and limitations. The existing finite versions have simple definitions, but they are artificial in their construction and do not allow an intuitive state analysis. The continuous versions have more complicated definitions, but they are similar to the original Wigner function and allow a visualization of the quantum states. The version based on the concept of tight frame we present is finite, but it has certain properties and applications similar to those of continuous versions. Based on the frame representation, we present several graphical representations of qubit states, and define a new parameter concerning them. We show that, from a mathematical point of view, the qubit is the orthogonal projection of qutrit.

Related papers

A Canonicalization Perspective on Invariant and Equivariant Learning [54.44572887716977]
We introduce a canonicalization perspective that provides an essential and complete view of the design of frames. We show that there exists an inherent connection between frames and canonical forms. We design novel frames for eigenvectors that are strictly superior to existing methods.
arXiv Detail & Related papers (2024-05-28T17:22:15Z)
Discrete Graph Auto-Encoder [52.50288418639075]
We introduce a new framework named Discrete Graph Auto-Encoder (DGAE) We first use a permutation-equivariant auto-encoder to convert graphs into sets of discrete latent node representations. In the second step, we sort the sets of discrete latent representations and learn their distribution with a specifically designed auto-regressive model.
arXiv Detail & Related papers (2023-06-13T12:40:39Z)
Operational Quantum Reference Frame Transformations [0.0]
We provide a general, operationally motivated framework for quantum reference frames and their transformations. The work is built around the notion of operational equivalence, in which quantum states that cannot be physically distinguished are identified. We give an explicit realisation in the setting that the initial frame admits a highly localized state with respect to the frame observable.
arXiv Detail & Related papers (2023-03-24T13:58:21Z)
A CS guide to the quantum singular value transformation [8.280261095877783]
We present a simplified exposition of some pieces of [Gily'en, Su, Low, and Wiebe, STOC'19, arXiv:1806.01838], which introduced a quantum singular transformation (QSVT) The QSVT framework has garnered substantial recent interest from the quantum algorithms community.
arXiv Detail & Related papers (2023-02-28T05:37:44Z)
Bloch Sphere Binary Trees: A method for the visualization of sets of multi-qubit systems pure states [0.0]
We present a mapping that can uniquely represent a set of arbitrary multi-qubit pure states on what we call a Binary Tree of Bloch Spheres. The backbone of this technique is the combination of the Schmidt decomposition and the Bloch sphere representation. We illustrate how this can be used in the context of understanding the time evolution of quantum states.
arXiv Detail & Related papers (2023-02-06T17:39:19Z)
Quantum State Transfer in Graphs with Tails [0.0]
We consider quantum state transfer on finite graphs which are attached to infinite paths. The finite graph represents an operational quantum system for performing useful quantum information tasks. We show that em perfect state transfer can surprisingly still occur on the finite graph even in the presence of the infinite tails.
arXiv Detail & Related papers (2022-11-27T03:15:02Z)
Quantum Wigner entropy [0.0]
We define the Wigner entropy of a quantum state as the differential Shannon entropy of the Wigner function of the state. We conjecture that it is lower bounded by $lnpi +1$ within the convex set of Wigner-positive states. The Wigner entropy is anticipated to be a significant physical quantity, for example, in quantum optics.
arXiv Detail & Related papers (2021-05-26T21:12:50Z)
Spectra of Perfect State Transfer Hamiltonians on Fractal-Like Graphs [62.997667081978825]
We study the spectral features, on fractal-like graphs, of Hamiltonians which exhibit the special property of perfect quantum state transfer. The essential goal is to develop the theoretical framework for understanding the interplay between perfect quantum state transfer, spectral properties, and the geometry of the underlying graph.
arXiv Detail & Related papers (2020-03-25T02:46:14Z)
Quantum Geometric Confinement and Dynamical Transmission in Grushin Cylinder [68.8204255655161]
We classify the self-adjoint realisations of the Laplace-Beltrami operator minimally defined on an infinite cylinder. We retrieve those distinguished extensions previously identified in the recent literature, namely the most confining and the most transmitting.
arXiv Detail & Related papers (2020-03-16T11:37:23Z)
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)
Quantum-secure message authentication via blind-unforgeability [74.7729810207187]
We propose a natural definition of unforgeability against quantum adversaries called blind unforgeability. This notion defines a function to be predictable if there exists an adversary who can use "partially blinded" access to predict values. We show the suitability of blind unforgeability for supporting canonical constructions and reductions.
arXiv Detail & Related papers (2018-03-10T05:31:38Z)

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