The descriptive complexity of the set of Poisson generic numbers
Abstract
Let b 2 be an integer. We show that the set of real numbers that are Poisson generic in base b is 03-complete in the Borel hierarchy of subsets of the real line. Furthermore, the set of real numbers that are Borel normal in base b and not Poisson generic in base b is complete for the class given by the differences between 03 sets. We also show that the effective versions of these results hold in the effective Borel hierarchy.
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