Space-bounded online Kolmogorov complexity is additive

Abstract

The even online Kolmogorov complexity of a string x = x1 x2 ·s xn is the minimal length of a program that for all i n/2, on input x1x3 ·s x2i-1 outputs x2i. The odd complexity is defined similarly. The sum of the odd and even complexities is called the dialogue complexity. In [Bauwens, 2014] it is proven that for all n, there exist n-bit x for which the dialogue complexity exceeds the Kolmogorov complexity by n 4 3 + O( n). Let Cs(x) denote the Kolmogorov complexity with space bound~s. Here, we prove that the space-bounded dialogue complexity with bound s + 6n + O(1) is at most Cs(x) + O( (sn)), where n=|x|.

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