Additive Energy and Irregularities of Distribution
引用次数: 3
Abstract
Abstract We consider strictly increasing sequences (an)n≥1 of integers and sequences of fractional parts ({anα})n≥1 where α ∈ R. We show that a small additive energy of (an)n≥1 implies that for almost all α the sequence ({anα})n≥1 has large discrepancy. We prove a general result, provide various examples, and show that the converse assertion is not necessarily true.加性能量与分布的不规则性
考虑整数序列(an)n≥1和分数部分序列({anα})n≥1(其中α∈r)的严格递增,我们证明了(an)n≥1的小加性能量意味着对于几乎所有α,序列({anα})n≥1有很大的差异。我们证明了一个一般的结果,提供了各种例子,并证明了相反的断言不一定是正确的。
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