A unified approach to synchronization problems over subgroups of the orthogonal group

IF 2.6 2区 数学 Q1 MATHEMATICS, APPLIED Applied and Computational Harmonic Analysis Pub Date : 2023-09-01 DOI:10.1016/j.acha.2023.05.002
Huikang Liu , Man-Chung Yue , Anthony Man-Cho So
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Abstract

The problem of synchronization over a group G aims to estimate a collection of group elements G1,,GnG based on noisy observations of a subset of all pairwise ratios of the form GiGj1. Such a problem has gained much attention recently and finds many applications across a wide range of scientific and engineering areas. In this paper, we consider the class of synchronization problems in which the group is a closed subgroup of the orthogonal group. This class covers many group synchronization problems that arise in practice. Our contribution is fivefold. First, we propose a unified approach for solving this class of group synchronization problems, which consists of a suitable initialization step and an iterative refinement step based on the generalized power method, and show that it enjoys a strong theoretical guarantee on the estimation error under certain assumptions on the group, measurement graph, noise, and initialization. Second, we formulate two geometric conditions that are required by our approach and show that they hold for various practically relevant subgroups of the orthogonal group. The conditions are closely related to the error-bound geometry of the subgroup — an important notion in optimization. Third, we verify the assumptions on the measurement graph and noise for standard random graph and random matrix models. Fourth, based on the classic notion of metric entropy, we develop and analyze a novel spectral-type estimator. Finally, we show via extensive numerical experiments that our proposed non-convex approach outperforms existing approaches in terms of computational speed, scalability, and/or estimation error.

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正交群子群上同步问题的统一方法
群G上的同步问题旨在基于形式为Gi,Gj−1的所有成对比率的子集的噪声观测来估计群元素G1,…,Gn∈G的集合。这一问题最近引起了人们的广泛关注,并在广泛的科学和工程领域得到了许多应用。在本文中,我们考虑了一类同步问题,其中群是正交群的闭子群。本课程涵盖了实践中出现的许多组同步问题。我们的贡献是五倍。首先,我们提出了一种解决这类群同步问题的统一方法,该方法包括一个合适的初始化步骤和一个基于广义幂方法的迭代精化步骤,并表明在对群、测量图、噪声和初始化的某些假设下,它对估计误差有很强的理论保证。其次,我们公式化了我们的方法所需要的两个几何条件,并证明它们适用于正交群的各种实际相关子群。条件与子群的误差界几何密切相关,这是优化中的一个重要概念。第三,我们验证了标准随机图和随机矩阵模型对测量图和噪声的假设。第四,基于度量熵的经典概念,我们开发并分析了一种新的谱型估计器。最后,我们通过大量的数值实验表明,我们提出的非凸方法在计算速度、可扩展性和/或估计误差方面优于现有方法。
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来源期刊
Applied and Computational Harmonic Analysis
Applied and Computational Harmonic Analysis 物理-物理:数学物理
CiteScore
5.40
自引率
4.00%
发文量
67
审稿时长
22.9 weeks
期刊介绍: Applied and Computational Harmonic Analysis (ACHA) is an interdisciplinary journal that publishes high-quality papers in all areas of mathematical sciences related to the applied and computational aspects of harmonic analysis, with special emphasis on innovative theoretical development, methods, and algorithms, for information processing, manipulation, understanding, and so forth. The objectives of the journal are to chronicle the important publications in the rapidly growing field of data representation and analysis, to stimulate research in relevant interdisciplinary areas, and to provide a common link among mathematical, physical, and life scientists, as well as engineers.
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