HIGH-ORDER COPOSITIVE TENSORS AND ITS APPLICATIONS

被引:19
|
作者
Chen, Haibin [1 ]
Wang, Yiju [1 ]
机构
[1] Qufu Normal Univ, Sch Management Sci, Rizhao 276800, Shandong, Peoples R China
来源
JOURNAL OF APPLIED ANALYSIS AND COMPUTATION | 2018年 / 8卷 / 06期
基金
中国博士后科学基金;
关键词
Copositive tensor; tensor complementarity problem; homogeneous polynomial; tensor eigenvalue; hypergraphs; FRACTIONAL DIFFERENTIAL-EQUATIONS; IMPLICIT DEGREE CONDITION; POSITIVE SOLUTIONS; POLYNOMIAL OPTIMIZATION; COMPLEMENTARITY-PROBLEM; PROJECTION ALGORITHM; EIGENVALUE ANALYSIS; HAMILTON CYCLES; LEVEL SETS; BLOW-UP;
D O I
10.11948/2018.1863
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
With the coming of the big data era, high-order high-dimensional structured tensors received much attentions of researchers' in recent years, and now they are developed into a new research branch in mathematics named multilinear algebra. As a special kind of structured tensor, the copositive tensor receives a special concern due to its wide applications in vacuum stability of a general scalar potential, polynomial optimization, tensor complementarity problem and tensor eigenvalue complementarity problem. In this review, we will give a simple survey on recent advances of high-order copositive tensors and its applications. Some potential research directions in the future are also listed in the paper.
引用
收藏
页码:1863 / 1885
页数:23
相关论文
共 50 条
  • [21] Applications of high-order harmonic generation
    Descamps, D
    Norin, J
    Lyngå, C
    Buil, S
    L'Huillier, A
    Wahlström, CG
    Sorensen, SL
    Björneholm, O
    Gisselbrecht, M
    Meyer, M
    Hergott, JF
    Merdji, H
    Salières, P
    Bellini, M
    Huller, S
    [J]. MULTIPHOTON PROCESSES, 2000, 525 : 337 - 348
  • [22] Efficient Parallel Sparse Symmetric Tucker Decomposition for High-Order Tensors
    Shivakumar, Shruti
    Li, Jiajia
    Kannan, Ramakrishnan
    Aluru, Srinivas
    [J]. PROCEEDINGS OF THE 2021 SIAM CONFERENCE ON APPLIED AND COMPUTATIONAL DISCRETE ALGORITHMS, ACDA21, 2021, : 193 - 204
  • [23] SPEEDING UP OF KERNEL-BASED LEARNING FOR HIGH-ORDER TENSORS
    Karmouda, Ouafae
    Boulanger, Jeremie
    Boyer, Remy
    [J]. 2021 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH AND SIGNAL PROCESSING (ICASSP 2021), 2021, : 2905 - 2909
  • [24] CANDECOMP/PARAFAC Decomposition of High-Order Tensors Through Tensor Reshaping
    Phan, Anh-Huy
    Tichavsky, Petr
    Cichocki, Andrzej
    [J]. IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2013, 61 (19) : 4847 - 4860
  • [25] A TT-BASED HIERARCHICAL FRAMEWORK FOR DECOMPOSING HIGH-ORDER TENSORS
    Zniyed, Yassine
    Boyer, Remy
    De Almeida, Andre L. F.
    Favier, Gerard
    [J]. SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2020, 42 (02): : A822 - A848
  • [26] A sparse rank-1 approximation algorithm for high-order tensors
    Wang, Yiju
    Dong, Manman
    Xu, Yi
    [J]. APPLIED MATHEMATICS LETTERS, 2020, 102
  • [27] Symmetric rank-1 approximation of symmetric high-order tensors
    Wu, Leqin
    Liu, Xin
    Wen, Zaiwen
    [J]. OPTIMIZATION METHODS & SOFTWARE, 2020, 35 (02): : 416 - 438
  • [28] Necessary and sufficient conditions for copositive tensors
    Song, Yisheng
    Qi, Liqun
    [J]. LINEAR & MULTILINEAR ALGEBRA, 2015, 63 (01): : 120 - 131
  • [29] PARTIALLY SYMMETRIC NONNEGATIVE RECTANGULAR TENSORS AND COPOSITIVE RECTANGULAR TENSORS
    Gu, Yining
    Wu, Wei
    [J]. JOURNAL OF INDUSTRIAL AND MANAGEMENT OPTIMIZATION, 2019, 15 (02) : 775 - 789
  • [30] Implementation of a Denoising Algorithm Based on High-Order Singular Value Decomposition of Tensors
    Feschet, Fabien
    [J]. IMAGE PROCESSING ON LINE, 2019, 9 : 158 - 182
12345