Old and new results on the Furstenberg sets
Abstract
This paper is a complement to our previous paper [21]. It surveys the works on the Furstenberg set S=\2m3n: n 0, m 0\ and its random version T. We also present some new results. For example, it is proved that T almost surely contains a subset of positive lower density which is 43-Rider. It is also proved that a class of random sets of integers are Sidon sets when Bourgain's condition is not satisfied; this generalizes a result of Kahane-Katznelson. Some open questions about S and T are listed at the end of the paper.
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