Concentration of dimension in extremal points of left-half lines in the Lagrange spectrum
Abstract
We prove that for any η that belongs to the closure of the interior of the Markov and Lagrange spectra, the sets k-1((-∞,η]) and k-1(η), which are the sets of irrational numbers with best constant of Diophantine approximation bounded by η and exactly η respectively, have the same Hausdorff dimension. We also show that, as η varies in the interior of the spectra, this Hausdorff dimension is a strictly increasing function.
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