We propose a fast non-gradient-based method of rank-1 non-negative matrix factorization (NMF) for missing data, called A1GM, that minimizes the KL divergence from an input matrix to the reconstructed rank-1 matrix. Our method is based on our new finding of an analytical closed-formula of the best rank-1 non-negative multiple matrix factorization (NMMF), a variety of NMF. NMMF is known to exactly solve NMF for missing data if positions of missing values satisfy a certain condition, and A1GM transforms a given matrix so that the analytical solution to NMMF can be applied. We empirically show that A1GM is more efficient than a gradient method with competitive reconstruction errors.
翻译:我们建议对缺失数据采用快速非梯度非负矩阵因子化法(NMF),称为A1GM(NMF),以尽量减少KL从输入矩阵向重建的1级矩阵的偏差,我们的方法是基于我们的新发现,即最佳1级非负多重矩阵因子化(NMMF)的分析封闭模式(MMMF)是多种多样的NMF(NMF),已知NMMM(NMF)可以精确地解决缺失数据NMF(NMF),如果缺失值位置满足一定条件,A1GM(NM)转换了给定矩阵,以便能够应用对NMMMF的分析解决方案。我们的经验显示,A1GM(A1GM)比具有竞争性重建错误的梯度法更有效。
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