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Paper detail

Game interpretation of Kolmogorov complexity

The Kolmogorov complexity function K can be relativized using any oracle A, and most properties of K remain true for relativized versions. In section 1 we provide an explanation for this observation by giving a game-theoretic interpretation and showing that all "natural" properties are either true for all sufficiently powerful oracles or false for all sufficiently powerful oracles. This result is a simple consequence of Martin's determinacy theorem, but its proof is instructive: it shows how one can prove statements about Kolmogorov complexity by constructing a special game and a winning strategy in this game. This technique is illustrated by several examples (total conditional complexity, bijection complexity, randomness extraction, contrasting plain and prefix complexities).

preprint2010arXivOpen access
Andrej A. MuchnikIlya MezhirovAlexander ShenNikolay Vereshchagin
math.ITInformation TheoryComputer Science and Game Theorymath.LO
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Andrej A. MuchnikIlya MezhirovAlexander ShenNikolay Vereshchagin

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