Sparse analytic systems
Abstract
Erdos MR168482 proved that the Continuum Hypothesis (CH) is equivalent to the existence of an uncountable family F of (real or complex) analytic functions, such that \ f(x) \ : \ f ∈ F \ is countable for every x. We strengthen Erdos' result by proving that CH is equivalent to the existence of what we call sparse analytic systems of functions. We use such systems to construct, assuming CH, an equivalence relation on R such that any "analytic-anonymous" attempt to predict the map x [x] must fail almost everywhere. This provides a consistently negative answer to a question of Bajpai-Velleman MR3552748.
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