白箱对抗流的改进算法。

Ying Feng, David P Woodruff
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引用次数: 0

摘要

我们研究的是白箱对抗流模型中的流算法,在这种模型中,流算法的内部状态会透露给一个自适应生成流更新的对手,但算法会在每个时间步获得对手未知的新随机性。我们结合密码学假设,构建了针对此类对手的鲁棒算法。我们提出了矢量稀疏恢复、矩阵和张量低秩恢复以及矩阵低秩加稀疏恢复(即鲁棒性 PCA)的高效算法。与确定性算法不同的是,我们的算法可以在输入不稀疏或低秩时报告,即使存在这样的对手。我们利用这些恢复算法来改进和解决白箱对抗流上的数值线性代数和组合优化中的新问题。例如,我们给出了第一种高效算法,用于在匹配大小较小的情况下,在边有插入和删除的图中输出匹配,否则我们宣布匹配大小较大。我们还改进了以前工作中在估计向量中的非零元素数量和计算矩阵秩时的近似值与内存之间的权衡。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Improved Algorithms for White-Box Adversarial Streams.

We study streaming algorithms in the white-box adversarial stream model, where the internal state of the streaming algorithm is revealed to an adversary who adaptively generates the stream updates, but the algorithm obtains fresh randomness unknown to the adversary at each time step. We incorporate cryptographic assumptions to construct robust algorithms against such adversaries. We propose efficient algorithms for sparse recovery of vectors, low rank recovery of matrices and tensors, as well as low rank plus sparse recovery of matrices, i.e., robust PCA. Unlike deterministic algorithms, our algorithms can report when the input is not sparse or low rank even in the presence of such an adversary. We use these recovery algorithms to improve upon and solve new problems in numerical linear algebra and combinatorial optimization on white-box adversarial streams. For example, we give the first efficient algorithm for outputting a matching in a graph with insertions and deletions to its edges provided the matching size is small, and otherwise we declare the matching size is large. We also improve the approximation versus memory tradeoff of previous work for estimating the number of non-zero elements in a vector and computing the matrix rank.

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