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LOGCOM
2007

Algorithmic Randomness of Closed Sets

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Algorithmic Randomness of Closed Sets
We investigate notions of randomness in the space C[2N ] of nonempty closed subsets of {0, 1}N . A probability measure is given and a version of the Martin-L¨of test for randomness is defined. Π0 2 random closed sets exist but there are no random Π0 1 closed sets. It is shown that any random closed set is perfect, has measure 0, and has box dimension log2 4 3 . A random closed set has no n-c.e. elements. A closed subset of 2N may be defined as the set of infinite paths through a tree and so the problem of compressibility of trees is explored. If Tn = T ∩ {0, 1}n , then for any random closed set [T] where T has no dead ends, K(Tn) ≥ n − O(1) but for any k, K(Tn) ≤ 2n−k +O(1), where K(σ) is the prefix-free complexity of σ ∈ {0, 1}∗ . .
George Barmpalias, Paul Brodhead, Douglas Cenzer,
Added 16 Dec 2010
Updated 16 Dec 2010
Type Journal
Year 2007
Where LOGCOM
Authors George Barmpalias, Paul Brodhead, Douglas Cenzer, Seyyed Dashti, Rebecca Weber
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