The task of matrix completion involves estimating the entries of a matrix, M ∈ R~(m×n), when a subset, Ω is contained in {(i, j) : 1 ≤ i ≤ m, 1 ≤ j ≤ n} of the entries are observed. A particular set of low rank models for this task approximate the matrix as a product of two low rank matrices, M = UV~T, where U ∈ R~(m×k) and V ∈ R~(n×k) and k << min{m, n}. A popular algorithm of choice in practice for recovering M from the partially observed matrix using the low rank assumption is alternating least square (ALS) minimization, which involves optimizing over U and V in an alternating manner to minimize the squared error over observed entries while keeping the other factor fixed. Despite being widely experimented in practice, only recently were theoretical guarantees established bounding the error of the matrix estimated from ALS to that of the original matrix M. In this work we extend the results for a noiseless setting and provide the first guarantees for recovery under noise for alternating minimization. We specifically show that for well conditioned matrices corrupted by random noise of bounded Frobenius norm, if the number of observed entries is O (k~7 nlog n), then the ALS algorithm recovers the original matrix within an error bound that depends on the norm of the noise matrix. The sample complexity is the same as derived in for the noise-free matrix completion using ALS.
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机译:矩阵完成的任务涉及估计矩阵的条目M∈R〜(m×n),当子集中,ω包含在{(i,j)中包含:1≤i≤m,1≤j≤n}观察到条目。针对此任务的特定低等级模型近似于矩阵作为两个低等级矩阵的乘积,M = UV〜T,其中U∈R〜(m×k)和V∈r〜(n×k)和k << min {m,n}。一种流行的选择算法,用于使用低等级假设从部分观察到的矩阵恢复M的实践中是交替的最小二乘(ALS)最小化,这涉及以交替的方式优化U和V,以最小化观察到的条目的平方误差在保持的同时在观察到的条目上最小化另一个因素固定。尽管在实践中被广泛进行了实验,但最近才建立了从ALS估计到原始矩阵M估计的矩阵误差的理论保障。在这项工作中,我们将结果扩展了无噪声设置,并提供了噪声下恢复的第一种保证用于交替最小化。我们专门显示,对于受界限Frobenius规范的随机噪声破坏的良好条件矩阵,如果观察到的条目的数量是O(k〜7 nlog n),则ALS算法在绑定符合规范的错误中恢复原始矩阵噪声矩阵。样本复杂度与使用ALS的无噪声矩阵完成的相同。
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