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COCO
2000
Springer
2000
Springer
Combinatorial Interpretation of Kolmogorov Complexity
Kolmogorov’s very first paper on algorithmic information theory (Kolmogorov, Problemy peredachi infotmatsii 1(1) (1965), 3) was entitled “Three approaches to the definition of the quantity of information”. These three approaches were called combinatorial, probabilistic and algorithmic. Trying to establish formal connections between combinatorial and algorithmic approaches, we prove that every linear inequality including Kolmogorov complexities could be translated into an equivalent combinatorial statement. (Note that the same linear inequalities are true for Kolmogorov complexities and Shannon entropy, see Hammer et al., (Proceedings of CCC’97, Ulm).) Entropy (complexity) proofs of combinatorial inequalities given in Llewellyn and Radhakrishnan (Personal Communication) and Hammer and Shen (Theory Comput. Syst. 31 (1998) 1) can be considered as special cases (and a natural starting points) for this translation.
Real-time TrafficAlgorithmic Information Theory | Algorithms | COCO 2000 | Equivalent Combinatorial Statement | Kolmogorov Complexities |
| Added | 02 Aug 2010 |
| Updated | 02 Aug 2010 |
| Type | Conference |
| Year | 2000 |
| Where | COCO |
| Authors | Andrei E. Romashchenko, Alexander Shen, Nikolai K. Vereshchagin |
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