Related papers: Construction of perfect tensors using biunimodular vectors

Construction of perfect tensors using biunimodular vectors

URL: http://arxiv.org/abs/2309.01504v2
Date: Tue, 12 Nov 2024 13:39:40 GMT
Title: Construction of perfect tensors using biunimodular vectors
Authors: Suhail Ahmad Rather,
Abstract summary: A class of dual unitary gates consists of rank-four perfect tensors that are equivalent to highly entangled multipartite pure states. A perfect tensor in local dimension six is equivalent to an AME state of four qudits, denoted as AME(4,6)
Score: 0.0
License:
Abstract: Dual unitary gates are highly non-local two-qudit unitary gates that have been studied extensively in quantum many-body physics and quantum information in the recent past. A special class of dual unitary gates consists of rank-four perfect tensors that are equivalent to highly entangled multipartite pure states called absolutely maximally entangled (AME) states. In this work, numerical and analytical constructions of dual unitary gates and perfect tensors that are diagonal in a special maximally entangled basis are presented. The main ingredient in our construction is a phase-valued (unimodular) two-dimensional array whose discrete Fourier transform is also unimodular. We obtain perfect tensors for several local Hilbert space dimensions, particularly, in dimension six. A perfect tensor in local dimension six is equivalent to an AME state of four qudits, denoted as AME(4,6). Such a state cannot be constructed from existing constructions of AME states based on error-correcting codes and graph states. An explicit construction of AME(4,6) states is provided in this work using two-qudit controlled and single-qudit gates making it feasible to generate such states experimentally.

Related papers

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)
Quantum convolutional channels and multiparameter families of 2-unitary matrices [0.0]
We present a novel approach to construct quantum channels with large entangling capacities inspired by convolution. In particular, we identify conditions necessary for the convolutional channels constructed using our method to possess maximal entangling power. We establish new, continuous classes of bipartite 2-unitary matrices of dimension $d2$ for $d = 7$ and $d = 9$, with $2$ and $4$ free nonlocal parameters.
arXiv Detail & Related papers (2023-12-29T18:14:56Z)
Quantum entanglement and contextuality with complexifications of $E_8$ root system [91.3755431537592]
The Witting configuration with 40 complex rays was suggested as a possible reformulation of Penrose model with two spin-3/2 systems based on geometry of dodecahedron. An analysis of properties of suggested configuration of quantum states is provided using many analogies with properties of Witting configuration.
arXiv Detail & Related papers (2022-10-27T11:23:12Z)
No invariant perfect qubit codes [0.0]
Perfect tensors describe highly entangled quantum states that have attracted particular attention in the fields of quantum information theory and quantum gravity. In loop quantum gravity, the natural question arises whether SU(2) invariant tensors, which are fundamental ingredients of the basis states of spacetime, can also be perfect.
arXiv Detail & Related papers (2022-10-05T18:03:19Z)
Penrose dodecahedron, Witting configuration and quantum entanglement [55.2480439325792]
A model with two entangled spin-3/2 particles based on geometry of dodecahedron was suggested by Roger Penrose. The model was later reformulated using so-called Witting configuration with 40 rays in 4D Hilbert space. Two entangled systems with quantum states described by Witting configurations are discussed in presented work.
arXiv Detail & Related papers (2022-08-29T14:46:44Z)
Experimental demonstration of optimal unambiguous two-out-of-four quantum state elimination [52.77024349608834]
A core principle of quantum theory is that non-orthogonal quantum states cannot be perfectly distinguished with single-shot measurements. Here we implement a quantum state elimination measurement which unambiguously rules out two of four pure, non-orthogonal quantum states.
arXiv Detail & Related papers (2022-06-30T18:00:01Z)
Construction and local equivalence of dual-unitary operators: from dynamical maps to quantum combinatorial designs [0.0]
We study the map analytically for the two-qubit case describing the basins of attraction, fixed points, and rates of approach to dual unitaries. A subset of dual-unitary operators having maximum entangling power are 2-unitary operators or perfect tensors. A necessary criterion for their local unitary equivalence to distinguish classes is also introduced and used to display various concrete results.
arXiv Detail & Related papers (2022-05-18T10:13:56Z)
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)
Entangling power of symmetric two-qubit quantum gates [0.0]
capacity of a quantum gate to produce entangled states on a bipartite system is quantified in terms of the entangling power. We focus on symmetric two-qubit quantum gates, acting on the symmetric two-qubit space. A geometric description of the local equivalence classes of gates is given in terms of the $mathfraksu(3)$ Lie algebra root vectors.
arXiv Detail & Related papers (2021-07-27T08:06:32Z)
Radiative topological biphoton states in modulated qubit arrays [105.54048699217668]
We study topological properties of bound pairs of photons in spatially-modulated qubit arrays coupled to a waveguide. For open boundary condition, we find exotic topological bound-pair edge states with radiative losses. By joining two structures with different spatial modulations, we find long-lived interface states which may have applications in storage and quantum information processing.
arXiv Detail & Related papers (2020-02-24T04:44:12Z)
Creating ensembles of dual unitary and maximally entangling quantum evolutions [0.0]
Maximally entangled bipartite unitary operators or gates find various applications from quantum information to building blocks of minimal models of many-body quantum chaos. We characterize the dual unitary operators via their entangling power and the 2-unitaries via the distribution of entanglement created from unentangled states.
arXiv Detail & Related papers (2019-12-27T08:29:58Z)

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