Pseudorandomness, symmetry, smoothing: II

Harm Derksen, Peter Ivanov, Chin Ho Lee, Emanuele Viola
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Abstract

We prove several new results on the Hamming weight of bounded uniform and small-bias distributions. We exhibit bounded-uniform distributions whose weight is anti-concentrated, matching existing concentration inequalities. This construction relies on a recent result in approximation theory due to Erd\'eyi (Acta Arithmetica 2016). In particular, we match the classical tail bounds, generalizing a result by Bun and Steinke (RANDOM 2015). Also, we improve on a construction by Benjamini, Gurel-Gurevich, and Peled (2012). We give a generic transformation that converts any bounded uniform distribution to a small-bias distribution that almost preserves its weight distribution. Applying this transformation in conjunction with the above results and others, we construct small-bias distributions with various weight restrictions. In particular, we match the concentration that follows from that of bounded uniformity and the generic closeness of small-bias and bounded-uniform distributions, answering a question by Bun and Steinke (RANDOM 2015). Moreover, these distributions are supported on only a constant number of Hamming weights. We further extend the anti-concentration constructions to small-bias distributions perturbed with noise, a class that has received much attention recently in derandomization. Our results imply (but are not implied by) a recent result of the authors (CCC 2024), and are based on different techniques. In particular, we prove that the standard Gaussian distribution is far from any mixture of Gaussians with bounded variance.
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伪随机性、对称性、平滑:II
我们证明了有界均匀分布和小偏差分布的汉明权重的几个新结果。我们展示了权重反集中的有界均匀分布,与现有的集中不等式相匹配。这一构造依赖于 Erd\'eyi (Acta Arithmetica,2016 年)在近似理论中的最新结果。特别是,我们匹配了经典的尾边界,概括了 Bunand Steinke (RANDOM,2015 年)的一个结果。此外,我们还改进了 Benjamini、Gurel-Gurevich 和 Peled(2012)的构造。我们给出了一种通用变换,它能将任何有界均匀分布转换为几乎保留其权重分布的小偏差分布。结合上述结果和其他结果,我们构建了具有各种权重限制的小偏差分布。特别是,我们匹配了有界均匀性和小偏置分布与有界均匀分布的一般接近性所带来的集中性,回答了 Bun 和 Steinke(RANDOM2015)提出的一个问题。此外,这些分布只支持一定数量的哈明权重。我们进一步将反集中构造扩展到受噪声扰动的小偏差分布,这一类分布最近在反随机化中受到了广泛关注。我们的结果暗示(但不暗示)作者的新结果(CCC 2024),并且基于不同的技术。特别是,我们证明了标准高斯分布远离任何方差有界的高斯混合物。
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