奇异值分解
矩阵范数
奇异值
子空间拓扑
张量(固有定义)
聚类分析
系数矩阵
数学
规范(哲学)
基质(化学分析)
光谱聚类
算法
矩阵分解
结构张量
模式识别(心理学)
人工智能
计算机科学
纯数学
图像(数学)
特征向量
物理
材料科学
量子力学
政治学
法学
复合材料
作者
Wei Xia,Xiangdong Zhang,Quanxue Gao,Xiaochuang Shu,Jungong Han,Xinbo Gao
标识
DOI:10.1109/tcyb.2021.3052352
摘要
Despite the promising preliminary results, tensor-singular value decomposition (t-SVD)-based multiview subspace is incapable of dealing with real problems, such as noise and illumination changes. The major reason is that tensor-nuclear norm minimization (TNNM) used in t-SVD regularizes each singular value equally, which does not make sense in matrix completion and coefficient matrix learning. In this case, the singular values represent different perspectives and should be treated differently. To well exploit the significant difference between singular values, we study the weighted tensor Schatten p -norm based on t-SVD and develop an efficient algorithm to solve the weighted tensor Schatten p -norm minimization (WTSNM) problem. After that, applying WTSNM to learn the coefficient matrix in multiview subspace clustering, we present a novel multiview clustering method by integrating coefficient matrix learning and spectral clustering into a unified framework. The learned coefficient matrix well exploits both the cluster structure and high-order information embedded in multiview views. The extensive experiments indicate the efficiency of our method in six metrics.
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