Related papers: Localization of space-inhomogeneous three-state quantum walks

Localization of space-inhomogeneous three-state quantum walks

URL: http://arxiv.org/abs/2111.14300v3
Date: Fri, 22 Apr 2022 01:13:18 GMT
Title: Localization of space-inhomogeneous three-state quantum walks
Authors: Chusei Kiumi
Abstract summary: We construct the method for the eigenvalue problem via the transfer matrix for space-inhomogeneous $n$-state quantum walks in one dimension with $n-2$ self-loops. This method reveals the necessary and sufficient condition for the eigenvalue problem of a two-phase three-state quantum walk with one defect whose time evolution varies in the negative part, positive part, and at the origin.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Mathematical analysis on the existence of eigenvalues is essential because it is equivalent to the occurrence of localization, which is an exceptionally crucial property of quantum walks. We construct the method for the eigenvalue problem via the transfer matrix for space-inhomogeneous $n$-state quantum walks in one dimension with $n-2$ self-loops, which is an extension of the technique in a previous study (Quantum Inf. Process 20(5), 2021). This method reveals the necessary and sufficient condition for the eigenvalue problem of a two-phase three-state quantum walk with one defect whose time evolution varies in the negative part, positive part, and at the origin.

Related papers

Sample-Optimal Quantum State Tomography for Structured Quantum States in One Dimension [25.333797381352973]
We study whether the number of state copies can saturate the information theoretic bound (i.e., $O(n)$) using physical quantum measurements. We propose a projected gradient descent (PGD) algorithm to solve the constrained least-squares problem and show that it can efficiently find an estimate with bounded recovery error.
arXiv Detail & Related papers (2024-10-03T15:26:26Z)
Local unitary equivalence of arbitrary-dimensional multipartite quantum states [19.34942152423892]
Local unitary equivalence is an ingredient for quantifying and classifying entanglement. We find a variety of local unitary invariants for arbitrary-dimensional bipartite quantum states. We apply these invariants to estimate concurrence, a vital entanglement measure.
arXiv Detail & Related papers (2024-02-21T02:57:46Z)
An estimation theoretic approach to quantum realizability problems [0.0]
The aim of this thesis is to utilize mathematical techniques previously developed for the related problem of property estimation. Our primary result is to recognize a correspondence between (i) property values which are realized by some quantum state, and (ii) property values which are occasionally produced as estimates of a generic quantum state.
arXiv Detail & Related papers (2023-12-27T17:49:43Z)
Eigenvalue analysis of three-state quantum walks with general coin matrices [0.8022222226139029]
This research focuses on the transfer matrix of three-state quantum walks with a general coin matrix. We derive eigenvalues for models that were previously unanalyzable.
arXiv Detail & Related papers (2023-11-11T03:37:24Z)
Real-time dynamics of false vacuum decay [49.1574468325115]
We investigate false vacuum decay of a relativistic scalar field in the metastable minimum of an asymmetric double-well potential. We employ the non-perturbative framework of the two-particle irreducible (2PI) quantum effective action at next-to-leading order in a large-N expansion.
arXiv Detail & Related papers (2023-10-06T12:44:48Z)
Universality of critical dynamics with finite entanglement [68.8204255655161]
We study how low-energy dynamics of quantum systems near criticality are modified by finite entanglement. Our result establishes the precise role played by entanglement in time-dependent critical phenomena.
arXiv Detail & Related papers (2023-01-23T19:23:54Z)
Real quantum operations and state transformations [44.99833362998488]
Resource theory of imaginarity provides a useful framework to understand the role of complex numbers. In the first part of this article, we study the properties of real'' (quantum) operations in single-party and bipartite settings. In the second part of this article, we focus on the problem of single copy state transformation via real quantum operations.
arXiv Detail & Related papers (2022-10-28T01:08:16Z)
Quantum algorithms for grid-based variational time evolution [36.136619420474766]
We propose a variational quantum algorithm for performing quantum dynamics in first quantization. Our simulations exhibit the previously observed numerical instabilities of variational time propagation approaches.
arXiv Detail & Related papers (2022-03-04T19:00:45Z)
Strongly trapped space-inhomogeneous quantum walks in one dimension [0.30458514384586394]
localization is a characteristic phenomenon of space-inhomogeneous quantum walks in one dimension. In this paper, we introduce the analytical method to calculate eigenvectors using the transfer matrix. We also extend our results to characterize eigenvalues not only for two-phase quantum walks with one defect but also for a more general space-inhomogeneous model.
arXiv Detail & Related papers (2021-05-23T15:36:54Z)
Eigenvalues of two-phase quantum walks with one defect in one dimension [0.30458514384586394]
We study space-inhomogeneous quantum walks (QWs) on the integer lattice. We call them two-phase QWs with one defect. In this paper, we obtain a necessary and sufficient condition for the existence of eigenvalues.
arXiv Detail & Related papers (2020-10-16T11:32:33Z)
Topological delocalization in the completely disordered two-dimensional quantum walk [0.0]
We investigate the effect of spatial disorder on two-dimensional split-step discrete-time quantum walks with two internal "coin" states. We find that spatial disorder of the most general type, i.e., position-dependent Haar random coin operators, does not lead to Anderson localization but to a diffusive spread instead. This is a delocalization, which happens because disorder places the quantum walk to a critical point between different anomalous Floquet-Anderson insulating topological phases.
arXiv Detail & Related papers (2020-05-01T03:57:37Z)

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