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APAL
2010

Elementary differences between the degrees of unsolvability and degrees of compressibility

14 years 20 days ago
Elementary differences between the degrees of unsolvability and degrees of compressibility
Given two infinite binary sequences A, B we say that B can compress at least as well as A if the prefix-free Kolmogorov complexity relative to B of any binary string is at most as much as the prefix-free Kolmogorov complexity relative to A, modulo a constant. This relation, introduced in [Nie05] and denoted by A LK B, is a measure of relative compressing power of oracles, in the same way that Turing reducibility is a measure of relative information. The equivalence classes induced by LK are called LK degrees (or degrees of compressibility) and there is a least degree containing the oracles which can only compress as much as a computable oracle, also called the `low for K' sets. A classic result from [Nie05] states that these coincide with the K-trivial sets, which are the ones having minimal prefix-free Kolmogorov complexity. We show that with respect to LK , given any non-trivial 0 2 sets X, Y there is a computably enumerable set A which is not K-trivial and it is below X, Y . Th...
George Barmpalias
Added 08 Dec 2010
Updated 08 Dec 2010
Type Journal
Year 2010
Where APAL
Authors George Barmpalias
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