Polynomial Depth, Highness and Lowness for E
Abstract
We study the relations between the notions of highness, lowness and logical depth in the setting of complexity theory. We introduce a new notion of polylog depth based on time bounded Kolmogorov complexity. We show polylog depth satisfies all basic logical depth properties, namely sets in P are not polylog deep, sets with (time bounded)-Kolmogorov complexity greater than polylog are not polylog deep, and only polylog deep sets can polynomially Turing compute a polylog deep set. We prove that if NP does not have p-measure zero, then NP contains polylog deep sets. We show that every high set for E contains a polylog deep set in its polynomial Turing degree, and that there exist low(E,EXP) polylog deep sets. Keywords: algorithmic information theory; Kolmogorov complexity; Bennett logical depth.
Keywords
Cite
@article{arxiv.1602.03332,
title = {Polynomial Depth, Highness and Lowness for E},
author = {Philippe Moser},
journal= {arXiv preprint arXiv:1602.03332},
year = {2019}
}
Comments
To be published in I&C