Coseparable Nonnegative Matrix Factorization

IF 1.5 2区 数学 Q2 MATHEMATICS, APPLIED SIAM Journal on Matrix Analysis and Applications Pub Date : 2023-09-15 DOI:10.1137/22m1510509
Junjun Pan, Michael K. Ng
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引用次数: 1

Abstract

Nonnegative matrix factorization (NMF) is a popular model in the field of pattern recognition. It aims to find a low rank approximation for nonnegative data M by a product of two nonnegative matrices W and H. In general, NMF is NP-hard to solve while it can be solved efficiently under separability assumption, which requires the columns of factor matrix are equal to columns of the input matrix. In this paper, we generalize separability assumption based on 3-factor NMF M=P_1SP_2, and require that S is a sub-matrix of the input matrix. We refer to this NMF as a Co-Separable NMF (CoS-NMF). We discuss some mathematics properties of CoS-NMF, and present the relationships with other related matrix factorizations such as CUR decomposition, generalized separable NMF(GS-NMF), and bi-orthogonal tri-factorization (BiOR-NM3F). An optimization model for CoS-NMF is proposed and alternated fast gradient method is employed to solve the model. Numerical experiments on synthetic datasets, document datasets and facial databases are conducted to verify the effectiveness of our CoS-NMF model. Compared to state-of-the-art methods, CoS-NMF model performs very well in co-clustering task, and preserves a good approximation to the input data matrix as well.
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可分离非负矩阵分解
非负矩阵分解(NMF)是模式识别领域的一个流行模型。它旨在通过两个非负矩阵W和h的乘积找到非负数据M的低秩逼近。一般来说,NMF是np难解的,而在可分性假设下可以有效求解,这要求因子矩阵的列等于输入矩阵的列。本文推广了基于3因子NMF M=P_1SP_2的可分性假设,并要求S是输入矩阵的子矩阵。我们将这种NMF称为可分离NMF (CoS-NMF)。讨论了CoS-NMF的一些数学性质,并给出了它与其他相关矩阵分解的关系,如CUR分解、广义可分NMF(GS-NMF)和双正交三因子分解(BiOR-NM3F)。提出了一种CoS-NMF优化模型,并采用交替快速梯度法对模型进行求解。在合成数据集、文档数据集和人脸数据库上进行了数值实验,验证了CoS-NMF模型的有效性。与目前最先进的方法相比,CoS-NMF模型在共聚类任务中表现良好,并且保持了对输入数据矩阵的良好近似。
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来源期刊
CiteScore
2.90
自引率
6.70%
发文量
61
审稿时长
6-12 weeks
期刊介绍: The SIAM Journal on Matrix Analysis and Applications contains research articles in matrix analysis and its applications and papers of interest to the numerical linear algebra community. Applications include such areas as signal processing, systems and control theory, statistics, Markov chains, and mathematical biology. Also contains papers that are of a theoretical nature but have a possible impact on applications.
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