Related papers: Multipartite entanglement and quantum error identification in $D$-dimensional cluster states

Multipartite entanglement and quantum error identification in $D$-dimensional cluster states

URL: http://arxiv.org/abs/2303.15508v2
Date: Thu, 31 Aug 2023 16:59:57 GMT
Title: Multipartite entanglement and quantum error identification in $D$-dimensional cluster states
Authors: Sowrabh Sudevan, Daniel Azses, Emanuele G. Dalla Torre, Eran Sela, Sourin Das
Abstract summary: We show how to create $m$-uniform states using local gates or interactions. We show how to achieve larger $m$ values using quasi-$D$ dimensional cluster states. This opens the possibility to use cluster states to benchmark errors on quantum computers.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: An entangled state is said to be $m$-uniform if the reduced density matrix of any $m$ qubits is maximally mixed. This is intimately linked to pure quantum error correction codes (QECCs), which allow not only to correct errors, but also to identify their precise nature and location. Here, we show how to create $m$-uniform states using local gates or interactions and elucidate several QECC applications. We first show that $D$-dimensional cluster states are $m$-uniform with $m=2D$. This zero-correlation length cluster state does not have finite size corrections to its $m=2D$ uniformity, which is exact both for infinite and for large enough but finite lattices. Yet at some finite value of the lattice extension in each of the $D$ dimensions, which we bound, the uniformity is degraded due to finite support operators which wind around the system. We also outline how to achieve larger $m$ values using quasi-$D$ dimensional cluster states. This opens the possibility to use cluster states to benchmark errors on quantum computers. We demonstrate this ability on a superconducting quantum computer, focusing on the 1D cluster state which, we show, allows to detect and identify 1-qubit errors, distinguishing $X$, $Y$ and $Z$ errors.

Related papers

Slow Mixing of Quantum Gibbs Samplers [47.373245682678515]
We present a quantum generalization of these tools through a generic bottleneck lemma. This lemma focuses on quantum measures of distance, analogous to the classical Hamming distance but rooted in uniquely quantum principles. Even with sublinear barriers, we use Feynman-Kac techniques to lift classical to quantum ones establishing tight lower bound $T_mathrmmix = 2Omega(nalpha)$.
arXiv Detail & Related papers (2024-11-06T22:51:27Z)
Quantum State Learning Implies Circuit Lower Bounds [2.2667044928324747]
We establish connections between state tomography, pseudorandomness, quantum state, circuit lower bounds. We show that even slightly non-trivial quantum state tomography algorithms would lead to new statements about quantum state synthesis.
arXiv Detail & Related papers (2024-05-16T16:46:27Z)
Mixed-state quantum anomaly and multipartite entanglement [8.070164241593814]
We show a surprising connection between mixed state entanglement and 't Hooft anomaly. We generate examples of mixed states with nontrivial long-ranged multipartite entanglement. We also briefly discuss mixed anomaly involving both strong and weak symmetries.
arXiv Detail & Related papers (2024-01-30T19:00:02Z)
Approximation Algorithms for Quantum Max-$d$-Cut [42.248442410060946]
The Quantum Max-$d$-Cut problem involves finding a quantum state that maximizes the expected energy associated with the projector onto the antisymmetric subspace of two, $d$-dimensional qudits over all local interactions. We develop an algorithm that finds product-state solutions of mixed states with bounded purity that achieve non-trivial performance guarantees.
arXiv Detail & Related papers (2023-09-19T22:53:17Z)
A note on Majorana representation of quantum states [0.0]
For any $d > 1$ there is a one-one correspondence between a quantum state of dimension $d$ and $d-1$ qubits represented as $d-1$ points in the Bloch sphere. We present a simple scheme for constructing $d-1$ points on the Bloch sphere and the corresponding $d-1$ qubits representing a $d$-dimensional quantum state.
arXiv Detail & Related papers (2023-08-27T13:29:40Z)
Constructions of $k$-uniform states in heterogeneous systems [65.63939256159891]
We present two general methods to construct $k$-uniform states in the heterogeneous systems for general $k$. We can produce many new $k$-uniform states such that the local dimension of each subsystem can be a prime power.
arXiv Detail & Related papers (2023-05-22T06:58:16Z)
Maximal gap between local and global distinguishability of bipartite quantum states [7.605814048051737]
We prove a tight and close-to-optimal lower bound on the effectiveness of local quantum measurements (without classical communication) at discriminating any two bipartite quantum states.
arXiv Detail & Related papers (2021-10-08T21:40:02Z)
Quantum double aspects of surface code models [77.34726150561087]
We revisit the Kitaev model for fault tolerant quantum computing on a square lattice with underlying quantum double $D(G)$ symmetry. We show how our constructions generalise to $D(H)$ models based on a finite-dimensional Hopf algebra $H$.
arXiv Detail & Related papers (2021-06-25T17:03:38Z)
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)
Constructing a ball of separable and absolutely separable states for $2\otimes d$ quantum system [0.0]
We find that the absolute separable states are useful in quantum computation even if it contains infinitesimal quantum correlation in it. In particular, for qubit-qudit system, we show that the newly constructed ball contain larger class of absolute separable states.
arXiv Detail & Related papers (2020-07-02T05:34:57Z)
Quantum Algorithms for Simulating the Lattice Schwinger Model [63.18141027763459]
We give scalable, explicit digital quantum algorithms to simulate the lattice Schwinger model in both NISQ and fault-tolerant settings. In lattice units, we find a Schwinger model on $N/2$ physical sites with coupling constant $x-1/2$ and electric field cutoff $x-1/2Lambda$. We estimate observables which we cost in both the NISQ and fault-tolerant settings by assuming a simple target observable---the mean pair density.
arXiv Detail & Related papers (2020-02-25T19:18:36Z)

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