Mutual Dimension and Random Sequences
Abstract
If and are infinite sequences over a finite alphabet, then the lower and upper mutual dimensions and are the upper and lower densities of the algorithmic information that is shared by and . In this paper we investigate the relationships between mutual dimension and coupled randomness, which is the algorithmic randomness of two sequences and with respect to probability measures that may be dependent on one another. For a restricted but interesting class of coupled probability measures we prove an explicit formula for the mutual dimensions and , and we show that the condition is necessary but not sufficient for and to be independently random. We also identify conditions under which Billingsley generalizations of the mutual dimensions and can be meaningfully defined; we show that under these conditions these generalized mutual dimensions have the "correct" relationships with the Billingsley generalizations of , , , and that were developed and applied by Lutz and Mayordomo; and we prove a divergence formula for the values of these generalized mutual dimensions.
Keywords
Cite
@article{arxiv.1603.09390,
title = {Mutual Dimension and Random Sequences},
author = {Adam Case and Jack H. Lutz},
journal= {arXiv preprint arXiv:1603.09390},
year = {2016}
}
Comments
This article is 23 pages. A preliminary version of part of this work was presented at the Fortieth International Symposium on Mathematical Foundations of Computer Science, August 24-28, 2015, in Milano, Italy