稀疏先验变分贝叶斯矩阵分解的近似方法

2017 IEEE 27th International Workshop on Machine Learning for Signal Processing (MLSP) Pub Date : 2017-09-01 DOI:10.1109/MLSP.2017.8168156

Ryota Kawasumi, K. Takeda

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引用次数: 0

摘要

本文研究了变分贝叶斯方法的矩阵分解问题，假设观测矩阵是低秩密集矩阵和稀疏矩阵的乘积，并附加了噪声。在稀疏矩阵先验的拉普拉斯分布假设下，通过最小化后验函数与试验函数之间的Kullback-Leibler散度，解析导出了矩阵分解的近似解。通过数值计算，讨论了解析解的矩阵分解精度。

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Approximate method of variational Bayesian matrix factorization with sparse prior

We study the problem of matrix factorization by variational Bayes method, under the assumption that observed matrix is the product of low-rank dense and sparse matrices with additional noise. Under assumption of Laplace distribution for sparse matrix prior, we analytically derive an approximate solution of matrix factorization by minimizing Kullback-Leibler divergence between posterior and trial function. By evaluating our solution numerically, we also discuss accuracy of matrix factorization of our analytical solution.

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来源期刊

2017 IEEE 27th International Workshop on Machine Learning for Signal Processing (MLSP)

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