Accelerated Alternating Projections for Robust Principal Component Analysis

被引:0
|
作者
Cai, HanQin [1 ]
Cai, Jian-Feng [2 ]
Wei, Ke [3 ]
机构
[1] Univ Calif Los Angeles, Dept Math, Los Angeles, CA 90024 USA
[2] Hong Kong Univ Sci & Technol, Dept Math, Hong Kong, Peoples R China
[3] Fudan Univ, Sch Data Sci, Shanghai, Peoples R China
来源
JOURNAL OF MACHINE LEARNING RESEARCH | 2019年 / 20卷
关键词
Robust PCA; Alternating Projections; Matrix Manifold; Tangent Space; Subspace Projection; RANK MATRIX COMPLETION; MINIMIZATION ALGORITHM;
D O I
暂无
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
We study robust PCA for the fully observed setting, which is about separating a low rank matrix L and a sparse matrix S from their sum D = L + S. In this paper, a new algorithm, dubbed accelerated alternating projections, is introduced for robust PCA which signi fi cantly improves the computational e ffi ciency of the existing alternating projections proposed in (Netrapalli et al., 2014) when updating the low rank factor. The acceleration is achieved by fi rst projecting a matrix onto some low dimensional subspace before obtaining a new estimate of the low rank matrix via truncated SVD. Exact recovery guarantee has been established which shows linear convergence of the proposed algorithm. Empirical performance evaluations establish the advantage of our algorithm over other state-of-theart algorithms for robust PCA.
引用
收藏
页数:33
相关论文
共 50 条
  • [1] Accelerated Structured Alternating Projections for Robust Spectrally Sparse Signal Recovery
    Cai, HanQin
    Cai, Jian-Feng
    Wang, Tianming
    Yin, Guojian
    IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2021, 69 : 809 - 821
  • [2] QUANTIZED TENSOR ROBUST PRINCIPAL COMPONENT ANALYSIS
    Aidini, Anastasia
    Tsagkatakis, Grigorios
    Tsakalides, Panagiotis
    2020 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH, AND SIGNAL PROCESSING, 2020, : 2453 - 2457
  • [3] Generalized mean for robust principal component analysis
    Oh, Jiyong
    Kwak, Nojun
    PATTERN RECOGNITION, 2016, 54 : 116 - 127
  • [4] ROBUST PRINCIPAL COMPONENT ANALYSIS WITH MATRIX FACTORIZATION
    Chen, Yongyong
    Zhou, Yicong
    2018 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH AND SIGNAL PROCESSING (ICASSP), 2018, : 2411 - 2415
  • [5] Randomized Method for Robust Principal Component Analysis
    Liu, Sanyang
    Zhang, Chong
    PROCEEDINGS OF THE 2ND INTERNATIONAL CONFERENCE ON COMPUTER SCIENCE AND APPLICATION ENGINEERING (CSAE2018), 2018,
  • [6] ROBUST PRINCIPAL COMPONENT ANALYSIS USING ALPHA DIVERGENCE
    Rekavandi, Aref Miri
    Seghouane, Abd-Krim
    2020 IEEE INTERNATIONAL CONFERENCE ON IMAGE PROCESSING (ICIP), 2020, : 6 - 15
  • [7] Robust Principal Component Analysis: A Median of Means Approach
    Paul, Debolina
    Chakraborty, Saptarshi
    Das, Swagatam
    IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS, 2024, 35 (11) : 16788 - 16800
  • [8] Fast deflation sparse principal component analysis via subspace projections
    Xu, Cong
    Yang, Min
    Zhang, Jin
    JOURNAL OF STATISTICAL COMPUTATION AND SIMULATION, 2020, 90 (08) : 1399 - 1412
  • [9] Coherence Pursuit: Fast, Simple, and Robust Principal Component Analysis
    Rahmani, Mostafa
    Atia, George K.
    IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2017, 65 (23) : 6260 - 6275
  • [10] Robust Principal Component Analysis using Density Power Divergence
    Roy, Subhrajyoty
    Basu, Ayanendranath
    Ghosh, Abhik
    JOURNAL OF MACHINE LEARNING RESEARCH, 2024, 25
12345