A dual version of Reimer's inequality and a proof of Rudich's Conjecture

被引：22

作者：

Kahn, J ^{[1
]}

Saks, M ^{[1
]}

Smyth, C ^{[1
]}

机构：

[1] Rutgers State Univ, Dept Math, Piscataway, NJ 08854 USA

来源：

15TH ANNUAL IEEE CONFERENCE ON COMPUTATIONAL COMPLEXITY, PROCEEDINGS | 2000年

关键词：

Reimer's inequality; van den Berg-Kesten conjecture; Rudich's conjecture;

D O I：

10.1109/CCC.2000.856739

中图分类号：

TP301 [理论、方法];

学科分类号：

081202 ;

摘要：

We prole a dual version of the celebrated inequality of D. Reimer (a.k.a. the van den Berg-Kesten conjecture). We use the dual inequality to prove a combinatorial conjecture of S. Rudich motivated by questions ill cryptographic complexity: One consequence of Rudich's Conjecture is that there is art oracle relative to which one-way functions exist but one-sr ar permutations do not. The dual inequality has another combinatorial consequence which allows R. Impagliazzo and S. Rudich to prove that if P = NP then NP boolean AND coNP subset of or equal to i.o.AvgP relative to a random oracle.

引用

页码：98 / 103

页数：6

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