The Furstenberg set and its random version
Abstract
We study some number-theoretic, ergodic and harmonic analysis properties of the Furstenberg set of integers S=\2m3n\ and compare them to those of its random analogue T. In this half-expository work, we show for example that S is "Khinchin distributed", is far from being Hartman-distributed while T is, and that S is a (p) set for all 2<p<∞ and that T is a p-Rider set for all p such that 4/3<p<2. Measure-theoretic and probabilistic techniques, notably martingales, play an important role in this work.
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