Residual Based Sampling for Online Low Rank Approximation

Aditya Bhaskara, Silvio Lattanzi, Sergei Vassilvitskii, Morteza Zadimoghaddam
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Abstract

We propose online algorithms for Column Subset Selection (CSS) and Principal Component Analysis (PCA), two methods that are widely employed for data analysis, summarization, and visualization. Given a data matrix A that is revealed one column at a time, the online CSS problems asks to keep a small set of columns, S, that best approximates the space spanned by the columns of A. As each column arrives, the algorithm must irrevocably decide whether to add it to S, or to ignore it. In the online PCA problem, the goal is to output a projection of each column to a low dimensional subspace. In other words, the algorithm must provide an embedding for each column as it arrives, which cannot be changed as new columns arrive.While both of these problems have been studied in the online setting, only additive approximations were known prior to our work. The core of our approach is an adaptive sampling technique that gives a practical and efficient algorithm for both of these problems. We prove that by sampling columns using their "residual norm" (i.e. their norm orthogonal to directions sampled so far), we end up with a significantly better dependence between the number of columns sampled, and the desired error in the approximation.We further show how to combine our algorithm "in series" with prior algorithms. In particular, using the results of Boutsidis et al. [5] and Frieze et al. [15] that have additive guarantees, we show how to improve the bounds on the error of our algorithm.
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基于残差的在线低秩逼近抽样
我们提出了列子集选择(CSS)和主成分分析(PCA)的在线算法,这两种方法被广泛用于数据分析,汇总和可视化。给定一个每次显示一列的数据矩阵a,在线CSS问题要求保留一小组列S,这最接近a的列所跨越的空间。当每列到达时,算法必须不可撤销地决定是将其添加到S中,还是忽略它。在在线PCA问题中,目标是将每列的投影输出到低维子空间。换句话说,算法必须在每个列到达时为其提供嵌入,不能在新列到达时更改。虽然这两个问题都在在线环境中进行了研究,但在我们的工作之前,只有加法近似是已知的。我们的方法的核心是一种自适应采样技术,它为这两个问题提供了一个实用而有效的算法。我们证明,通过使用它们的“残差范数”(即它们的范数与迄今为止采样的方向正交)对列进行采样,我们最终得到了采样列数与近似中期望的误差之间明显更好的相关性。我们进一步展示了如何将我们的算法与先前的算法“串联”起来。特别地,利用具有可加性保证的boutis等人[5]和Frieze等人[15]的结果,我们展示了如何改进我们算法的误差界。
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