伪随机性、对称性、平滑性:I

Harm Derksen, Peter Ivanov, Chin Ho Lee, Emanuele Viola
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引用次数: 0

摘要

我们证明了有界均匀分布和小偏置分布的几个新结果。其中一个主要信息是,小偏差分布即使受到噪声扰动,也不会比有界均匀分布更好地骗过几类测试。我们为阈值测试、小空间算法和小深度电路证明了这一点。特别是,我们得到的小偏差分布 1) 在与任何有界均匀分布的统计距离上达到了最优下限。这结束了阿隆、戈尔德里奇和曼苏尔在 2003 年发起的研究,并改进了奥唐纳和赵的结果。2) 具有比均匀分布更重的尾部质量。这回答了包括 Bun 和 Steinke 在内的一些研究人员提出的问题。3) 排除了 Ajtai 和 Wigderson 于 1989 年提出的一种构建伪随机发生器的流行范式。这再次回答了一些研究人员提出的问题。对于分支程序,我们的结果与 Forbes 和 Kelley 的约束相匹配。我们上述的小偏差分布是对称的。我们证明,任何两个对称小偏置分布的 xor 都能骗过任何有界函数。因此,我们的例子不能扩展到两个小偏置分布的 xor,这是另一种流行的范式,其威力仍然未知。我们还推广并简化了巴兹的一个结果的证明。
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Pseudorandomness, symmetry, smoothing: I
We prove several new results about bounded uniform and small-bias distributions. A main message is that, small-bias, even perturbed with noise, does not fool several classes of tests better than bounded uniformity. We prove this for threshold tests, small-space algorithms, and small-depth circuits. In particular, we obtain small-bias distributions that 1) achieve an optimal lower bound on their statistical distance to any bounded-uniform distribution. This closes a line of research initiated by Alon, Goldreich, and Mansour in 2003, and improves on a result by O'Donnell and Zhao. 2) have heavier tail mass than the uniform distribution. This answers a question posed by several researchers including Bun and Steinke. 3) rule out a popular paradigm for constructing pseudorandom generators, originating in a 1989 work by Ajtai and Wigderson. This again answers a question raised by several researchers. For branching programs, our result matches a bound by Forbes and Kelley. Our small-bias distributions above are symmetric. We show that the xor of any two symmetric small-bias distributions fools any bounded function. Hence our examples cannot be extended to the xor of two small-bias distributions, another popular paradigm whose power remains unknown. We also generalize and simplify the proof of a result of Bazzi.
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