资源有限测度的更强Kolmogorov 0 - 1定律

J. J. Dai
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引用次数: 3

摘要

在E类、E/sub 2/类、ESPACE类、E/sub 2/SPACE类、REC类和所有语言类上定义了资源边界度量。这里表明,如果C是这些类中的任何一类,而X是一组在有限变化下封闭且在C中具有小于1的外测度的语言,则X在C中具有0测度。这一结果加强了Lutz对经典Kolmogorov 0 - 1定律的资源有界推广。给出了证明复杂度类中一个测度为0的集合的一个有用的充分条件。
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A stronger Kolmogorov zero-one law for resource-bounded measure
Resource-bounded measure has been defined on the classes E, E/sub 2/, ESPACE, E/sub 2/SPACE, REC, and the class of all languages. It is shown here that if C is any of these classes and X is a set of languages that is closed under finite variations and has outer measure less than 1 in C, then X has measure 0 in C. This result strengthens Lutz's resource-bounded generalization of the classical Kolmogorov zero-one law. It also gives a useful sufficient condition for proving that a set has measure 0 in a complexity class.
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