On Time-Bounded Incompressibility of Compressible Strings and Sequences

Abstract

For every total recursive time bound t, a constant fraction of all compressible (low Kolmogorov complexity) strings is t-bounded incompressible (high time-bounded Kolmogorov complexity); there are uncountably many infinite sequences of which every initial segment of length n is compressible to n yet t-bounded incompressible below 1/4n - n; and there are countable infinitely many recursive infinite sequence of which every initial segment is similarly t-bounded incompressible. These results are related to, but different from, Barzdins's lemma.