On finitely many base q expansions
Abstract
Given some integer m ≥ 3, we find the first explicit collection of countably many intervals in (1,2) such that for any q in one of these intervals, the set of points with exactly m base q expansions is nonempty and moreover has positive Hausdorff dimension. Our method relies on an application of a theorem proved by Falconer and Yavicoli, which guarantees that the intersection of a family of compact subsets of Rd has positive Hausdorff dimension under certain conditions.
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