The dimension of the set of -badly approximable points in all ambient dimensions; on a question of Beresnevich and Velani
Abstract
Let :N [0,∞), (q)=q-(1+τ) and let -badly approximable points be those vectors in Rd that are -well approximable, but not c-well approximable for arbitrarily small constants c>0. We establish that the -badly approximable points have the Hausdorff dimension of the -well approximable points, the dimension taking the value (d+1)/(τ+1) familiar from theorems of Besicovitch and Jarn\'ik. The method of proof is an entirely new take on the Mass Transference Principle by Beresnevich and Velani (Annals, 2006); namely, we use the colloquially named `delayed pruning' to construct a sufficiently large set and combine this with ideas inspired by the proof of the Mass Transference Principle to find a large subset of the set. Our results are a generalisation of some 1-dimensional results due to Bugeaud and Moreira (Acta Arith, 2011), but our method of proof is nothing alike.
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