Independence, Relative Randomness, and PA Degrees

Abstract

We study pairs of reals that are mutually Martin-L\"of random with respect to a common, not necessarily computable probability measure. We show that a generalized version of van Lambalgen's Theorem holds for non-computable probability measures, too. We study, for a given real A, the independence spectrum of A, the set of all B so that there exists a probability measure μ so that μ\A,B\ = 0 and (A,B) is μ×μ-random. We prove that if A is r.e., then no 02 set is in the independence spectrum of A. We obtain applications of this fact to PA degrees. In particular, we show that if A is r.e.\ and P is of PA degree so that P ≥T A, then A P ≥T 0'.