On The Hausdorff Dimension of Weighted Badly Approximable Vectors

Abstract

Let τ=(τ1,…,τm)∈ R 0m satisfy Σi=1m τi>1 and τ1 ·s τm Let τ=(1,…,m) be given by i(q)=q-τi, i=1,…,m, and denote by Am(τ) the set of τ-approximable vectors in [0,1]m. The associated set of weighted τ-badly approximable vectors is defined by Bm(τ) = Am(τ) 0<c<1Am(cτ). The main result of this paper is that, for every ball B⊂eq [0,1]m, \[ H(B Bm(τ)) = HAm(τ). \] The proof extends the Cantor-type construction and mass distribution arguments of Koivusalo, Levesley, Ward, and Zhang from the unweighted to the weighted setting, and is independent of recent results on weighted exact approximation.

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