Nonnegative matrix factorization (NMF) has become a very popular technique in machine learning because it automatically extracts meaningful features through a sparse and part-based representation. However, NMF has the drawback of being highly ill-posed, that is, there typically exist many different but equivalent factorizations. In this paper, we introduce a completely new way to obtaining more well-posed NMF problems whose solutions are sparser. Our technique is based on the preprocessing of the nonnegative input data matrix, and relies on the theory of M-matrices and the geometric interpretation of NMF. This approach provably leads to optimal and sparse solutions under the separability assumption of Donoho and Stodden (2003), and, for rank-three matrices, makes the number of exact factorizations finite. We illustrate the effectiveness of our technique on several image data sets. color="gray">
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机译:非负矩阵分解(NMF)已成为机器学习中非常流行的技术,因为它会通过稀疏和基于零件的表示自动提取有意义的特征。但是,NMF的缺点是病态严重,即通常存在许多不同但等效的因式分解。在本文中,我们介绍了一种全新的方法来获取位置更合适的NMF问题。我们的技术基于非负输入数据矩阵的预处理,并依赖于M矩阵理论和NMF的几何解释。在Donoho和Stodden(2003)的可分离性假设下,该方法可证明导致最优和稀疏解,并且对于三阶矩阵,精确分解的数量是有限的。我们在几种图像数据集上说明了我们的技术的有效性。 color =“ gray”>
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