Effective Aspects of Bernoulli Randomness

Abstract

In this paper, we study Bernoulli random sequences, i.e., sequences that are Martin-L\"of random with respect to a Bernoulli measure μp for some p∈[0,1], where we allow for the possibility that p is noncomputable. We focus in particular on the case in which the underlying Bernoulli parameter p is proper (that is, Martin-L\"of random with respect to some computable measure). We show for every Bernoulli parameter p, if there is a sequence that is both proper and Martin-L\"of random with respect to μp, then p itself must be proper, and explore further consequences of this result. We also study the Turing degrees of Bernoulli random sequences, showing, for instance, that the Turing degrees containing a Bernoulli random sequence do not coincide with the Turing degrees containing a Martin-L\"of random sequence. Lastly, we consider several possible approaches to characterizing blind Bernoulli randomness, where the corresponding Martin-L\"of tests do not have access to the Bernoulli parameter p, and show that these fail to characterize blind Bernoulli randomness.