随机化Kaczmarz算法的学习理论

Junhong Lin, Ding-Xuan Zhou
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引用次数: 30

摘要

利用学习理论方法研究了最小二乘回归环境下的松弛随机化Kaczmarz算法。在采样值准确且回归函数(条件均值)为线性的情况下,该算法在非均匀采样界得到了较好的研究。在本文中,我们主要对噪声随机测量或非线性回归函数的不同情况感兴趣。在这种情况下,我们表明松弛是必要的。给出了松弛参数序列或步长在期望范围内收敛的充分必要条件。此外,还明确地给出了期望和概率的多项式收敛率。最后,利用Borel-Cantelli引理证明了该算法的收敛性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Learning theory of randomized Kaczmarz algorithm
A relaxed randomized Kaczmarz algorithm is investigated in a least squares regression setting by a learning theory approach. When the sampling values are accurate and the regression function (conditional means) is linear, such an algorithm has been well studied in the community of non-uniform sampling. In this paper, we are mainly interested in the different case of either noisy random measurements or a nonlinear regression function. In this case, we show that relaxation is needed. A necessary and sufficient condition on the sequence of relaxation parameters or step sizes for the convergence of the algorithm in expectation is presented. Moreover, polynomial rates of convergence, both in expectation and in probability, are provided explicitly. As a result, the almost sure convergence of the algorithm is proved by applying the Borel-Cantelli Lemma.
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