On Resource-bounded versions of the van Lambalgen theorem

Abstract

The van Lambalgen theorem is a surprising result in algorithmic information theory concerning the symmetry of relative randomness. It establishes that for any pair of infinite sequences A and B, B is Martin-L\"of random and A is Martin-L\"of random relative to B if and only if the interleaved sequence A B is Martin-L\"of random. This implies that A is relative random to B if and only if B is random relative to A vanLambalgen, Nies09, HirschfeldtBook. This paper studies the validity of this phenomenon for different notions of time-bounded relative randomness. We prove the classical van Lambalgen theorem using martingales and Kolmogorov compressibility. We establish the failure of relative randomness in these settings, for both time-bounded martingales and time-bounded Kolmogorov complexity. We adapt our classical proofs when applicable to the time-bounded setting, and construct counterexamples when they fail. The mode of failure of the theorem may depend on the notion of time-bounded randomness.