Non-Salem sets in metric Diophantine approximation
Abstract
A classical result of Kaufman states that, for each τ>1, the set of well approximable numbers \[ E(τ)=\x∈R: \|qx\| < |q|-τ for infinitely many integers q\ \] is a Salem set with Hausdorff dimension 2/(1+τ). A natural question to ask is whether the same phenomena holds for well approximable vectors in Rn. We prove that this is in general not the case. In addition, we also show that in Rn, n≥ 2, the set of badly approximable vectors is not Salem.
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