单向函数与Berman-Hartmanis猜想

2009 24th Annual IEEE Conference on Computational Complexity Pub Date : 2009-07-15 DOI:10.1109/CCC.2009.17

Manindra Agrawal, O. Watanabe

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引用次数: 10

摘要

Berman-Hartmanis猜想指出所有的np完全集合彼此是p同构的。在这个猜想上，我们首先改进了Agrawal先前的结果，并基于存在不能被随机化多项式时间算法反转的正则单向函数的假设，证明了所有np -完备集是P/多时间可计算的1,li-彼此可约的。其次，我们证明了除上述假设外，如果所有的单向函数都有一些容易被反转的部分，那么所有的np完全集合彼此是P/多同构的。

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One-Way Functions and the Berman-Hartmanis Conjecture

The Berman-Hartmanis conjecture states that all NP-complete sets are P-isomorphic each other. On this conjecture, we first improve the previous result of Agrawal and show that all NP-complete sets are P/poly-time computable 1,li-reducible to each other based on the assumption that there exist regular one-way functions that cannot be inverted by randomized polynomial-time algorithms. Secondly, we show that, besides the above assumption, if all one-way functions have some easy part to invert, then all NP-complete sets are P/poly-isomorphic to each other.

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2009 24th Annual IEEE Conference on Computational Complexity

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