The cell matrix closest to a given Euclidean distance matrix

被引:3
|
作者
Kurata, Hiroshi [1 ]
Tarazaga, Pablo [2 ]
机构
[1] Univ Tokyo, Grad Sch Arts & Sci, Tokyo 1138654, Japan
[2] Texas A&M Univ, Dept Math & Stat, Corpus Christi, TX 78412 USA
来源
LINEAR ALGEBRA AND ITS APPLICATIONS | 2015年 / 485卷
关键词
Cell matrix; Euclidean distance matrix; Projection; Majorization;
D O I
10.1016/j.laa.2015.07.030
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Cell matrix introduced by JakliC and Modic [6] is a special Euclidean distance matrix (EDM) that has a quite attractive and simple structure. It is of interest to approximate an EDM by a cell matrix. In this paper, we consider the problem of finding the cell matrix that is closest to a given EDM with respect to the Frobenius norm. The majorization ordering of the eigenvalues of a cell matrix is also discussed. (C) 2015 Elsevier Inc. All rights reserved.
引用
收藏
页码:194 / 207
页数:14
相关论文
共 50 条
  • [21] Command Coordination in Multi-agent Formation: Euclidean Distance Matrix Approaches
    Ahn, Hyo-Sung
    Oh, Kwang-Kyo
    INTERNATIONAL CONFERENCE ON CONTROL, AUTOMATION AND SYSTEMS (ICCAS 2010), 2010, : 1592 - 1597
  • [22] A Study of Euclidean Distance Matrix Computation on Intel Many-Core Processors
    Rechkalov, Timofey
    Zymbler, Mikhail
    PARALLEL COMPUTATIONAL TECHNOLOGIES, PCT 2018, 2018, 910 : 200 - 215
  • [23] Localization From Incomplete Euclidean Distance Matrix: Performance Analysis for the SVD-MDS Approach
    Zhang, Huan
    Liu, Yulong
    Lei, Hong
    IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2019, 67 (08) : 2196 - 2209
  • [24] D2D Cooperative Localization Approach Based on Euclidean Distance Matrix Completion
    Li, Yaohua
    Xie, Liangbo
    Zhou, Mu
    Jiang, Qing
    2020 IEEE/CIC INTERNATIONAL CONFERENCE ON COMMUNICATIONS IN CHINA (ICCC), 2020, : 52 - 56
  • [25] Formation Control of Quad-rotors in three dimension based on Euclidean Distance Dynamics Matrix
    Choi, Young-Cheol
    Ahn, Hyo-Sung
    2011 11TH INTERNATIONAL CONFERENCE ON CONTROL, AUTOMATION AND SYSTEMS (ICCAS), 2011, : 1168 - 1173
  • [26] On the distance from a matrix to nilpotents
    Mori, Michiya
    LINEAR ALGEBRA AND ITS APPLICATIONS, 2023, 679 : 99 - 103
  • [27] EUCLIDEAN DISTANCE MATRIX ANALYSIS - A COORDINATE-FREE APPROACH FOR COMPARING BIOLOGICAL SHAPES USING LANDMARK DATA
    LELE, S
    RICHTSMEIER, JT
    AMERICAN JOURNAL OF PHYSICAL ANTHROPOLOGY, 1991, 86 (03) : 415 - 427
  • [28] Generalized Euclidean distance matrices
    Balaji, R.
    Bapat, R. B.
    Goel, Shivani
    LINEAR & MULTILINEAR ALGEBRA, 2022, 70 (21) : 6908 - 6929
  • [29] Time Domain Objective Function Based on Euclidean Distance Matrix and its Application in Optimization of Short Pulse Power Divider
    Li, Shunli
    Liu, Leilei
    Yin, Xiaoxing
    Zhao, Hongxin
    IEEE MICROWAVE AND WIRELESS COMPONENTS LETTERS, 2016, 26 (01) : 4 - 6
  • [30] Majorization for the eigenvalues of Euclidean distance matrices
    Kurata, Hiroshi
    Tarazaga, Pablo
    LINEAR ALGEBRA AND ITS APPLICATIONS, 2012, 436 (05) : 1473 - 1481
12345