• DocumentCode
    1755350
  • Title

    Constructing a Nonnegative Low-Rank and Sparse Graph With Data-Adaptive Features

  • Author

    Liansheng Zhuang ; Shenghua Gao ; Jinhui Tang ; Jingjing Wang ; Zhouchen Lin ; Yi Ma ; Nenghai Yu

  • Author_Institution
    Sch. of Inf. Sci. & Technol., CAS Key Lab. of Electromagn. Space Inf., Hefei, China
  • Volume
    24
  • Issue
    11
  • fYear
    2015
  • fDate
    Nov. 2015
  • Firstpage
    3717
  • Lastpage
    3728
  • Abstract
    This paper aims at constructing a good graph to discover the intrinsic data structures under a semisupervised learning setting. First, we propose to build a nonnegative low-rank and sparse (referred to as NNLRS) graph for the given data representation. In particular, the weights of edges in the graph are obtained by seeking a nonnegative low-rank and sparse reconstruction coefficients matrix that represents each data sample as a linear combination of others. The so-obtained NNLRS-graph captures both the global mixture of subspaces structure (by the low-rankness) and the locally linear structure (by the sparseness) of the data, hence it is both generative and discriminative. Second, as good features are extremely important for constructing a good graph, we propose to learn the data embedding matrix and construct the graph simultaneously within one framework, which is termed as NNLRS with embedded features (referred to as NNLRS-EF). Extensive NNLRS experiments on three publicly available data sets demonstrate that the proposed method outperforms the state-of-the-art graph construction method by a large margin for both semisupervised classification and discriminative analysis, which verifies the effectiveness of our proposed method.
  • Keywords
    feature extraction; image classification; image reconstruction; image representation; learning (artificial intelligence); sparse matrices; NNLRS graph; data adaptive feature; data embedding matrix; data representation; discriminative analysis; nonnegative low-rank and sparse graph; semisupervised classification; semisupervised learning setting; sparse reconstruction coefficient matrix; Algorithm design and analysis; Complexity theory; Dictionaries; Noise; Optimization; Robustness; Sparse matrices; Data Embedding; Graph Construction; Low-Rank and Sparse Representation; Semi-Supervised Learning; data embedding; low-rank and sparse representation; semi-supervised learning;
  • fLanguage
    English
  • Journal_Title
    Image Processing, IEEE Transactions on
  • Publisher
    ieee
  • ISSN
    1057-7149
  • Type

    jour

  • DOI
    10.1109/TIP.2015.2441632
  • Filename
    7118181