Upper Bounds on Communication in Terms of Approximate Rank

IF 0.6 4区 计算机科学 Q4 COMPUTER SCIENCE, THEORY & METHODS
Anna Gál, Ridwan Syed
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引用次数: 0

Abstract

We show that any Boolean function with approximate rank r can be computed by bounded-error quantum protocols without prior entanglement of complexity \(O( \sqrt{r} \log r)\). In addition, we show that any Boolean function with approximate rank r and discrepancy \(\delta \) can be computed by deterministic protocols of complexity O(r), and private coin bounded-error randomized protocols of complexity \(O((\frac{1}{\delta })^2 + \log r)\). Our deterministic upper bound in terms of approximate rank is tight up to constant factors, and the dependence on discrepancy in our randomized upper bound is tight up to taking square-roots. Our results can be used to obtain lower bounds on approximate rank. We also obtain a strengthening of Newman’s theorem with respect to approximate rank.

近似等级的通信上限
我们证明,任何具有近似秩r的布尔函数都可以通过复杂度为(O( \sqrt{r} \log r)\)的无先验纠缠的有界错误量子协议来计算。此外,我们还证明,任何具有近似秩r和差分\(\delta \)的布尔函数都可以通过复杂度为O(r)的确定性协议和复杂度为\(O((\frac{1}{\delta })^2 + \log r)\的私有硬币有界错误随机协议来计算。)我们用近似等级表示的确定性上界在常数因子以内都是紧密的,而我们的随机上界中对差异的依赖在取平方根以内都是紧密的。我们的结果可以用来获得近似秩的下界。我们还得到了纽曼定理在近似秩方面的加强。
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来源期刊
Theory of Computing Systems
Theory of Computing Systems 工程技术-计算机:理论方法
CiteScore
1.90
自引率
0.00%
发文量
36
审稿时长
6-12 weeks
期刊介绍: TOCS is devoted to publishing original research from all areas of theoretical computer science, ranging from foundational areas such as computational complexity, to fundamental areas such as algorithms and data structures, to focused areas such as parallel and distributed algorithms and architectures.
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