指针追逐通过三角辨别

Combinatorics, Probability and Computing Pub Date : 2020-05-15 DOI:10.1017/S0963548320000085

A. Yehudayoff

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引用次数: 28

摘要

摘要证明了均匀分布下，当Bob先发言时，k步指针追逐问题的k轮分布复杂度的一个本质上尖锐的$\tilde \Omega (n/k)$下界。这是对Nisan和Wigderson的$\tilde \Omega (n/{k^2})$下界的改进，基本上与Klauck证明的随机下界相匹配。证明是信息论的，关键是用不对称三角判别代替总变异距离;这个想法可能在其他地方有用。

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Pointer chasing via triangular discrimination

Abstract We prove an essentially sharp $\tilde \Omega (n/k)$ lower bound on the k-round distributional complexity of the k-step pointer chasing problem under the uniform distribution, when Bob speaks first. This is an improvement over Nisan and Wigderson’s $\tilde \Omega (n/{k^2})$ lower bound, and essentially matches the randomized lower bound proved by Klauck. The proof is information-theoretic, and a key part of it is using asymmetric triangular discrimination instead of total variation distance; this idea may be useful elsewhere.

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来源期刊

Combinatorics, Probability and Computing

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