An Operational Characterization of Mutual Information in Algorithmic Information Theory

Andrei E. Romashchenko, Marius Zimand
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引用次数: 10

Abstract

We show that the mutual information, in the sense of Kolmogorov complexity, of any pair of strings x and y is equal, up to logarithmic precision, to the length of the longest shared secret key that two parties—one having x and the complexity profile of the pair and the other one having y and the complexity profile of the pair—can establish via a probabilistic protocol with interaction on a public channel. For ℓ > 2, the longest shared secret that can be established from a tuple of strings (x1, …, xℓ) by ℓ parties—each one having one component of the tuple and the complexity profile of the tuple—is equal, up to logarithmic precision, to the complexity of the tuple minus the minimum communication necessary for distributing the tuple to all parties. We establish the communication complexity of secret key agreement protocols that produce a secret key of maximal length for protocols with public randomness. We also show that if the communication complexity drops below the established threshold, then only very short secret keys can be obtained.
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算法信息论中互信息的运算表征
我们证明了任意一对字符串x和y的互信息,在Kolmogorov复杂度的意义上,在对数精度上等于两方(一方拥有x和这对字符串的复杂度配置文件,另一方拥有y和这对字符串的复杂度配置文件)可以通过在公共通道上交互的概率协议建立的最长共享密钥的长度。对于> 2的情况,由字符串(x1,…,x,)组成的元组中,由一个具有元组的一个组成部分和元组的复杂度曲线的z方建立的最长共享秘密,在对数精度范围内等于元组的复杂度减去将元组分发给所有方所需的最小通信量。对具有公共随机性的协议,建立了产生最大长度密钥的密钥协议的通信复杂度。我们还表明,如果通信复杂度低于设定的阈值,则只能获得非常短的密钥。
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