The Dirichlet spectrum with respect to L1 norm is [12,1]
Abstract
We prove that the one-dimensional Dirichlet spectrum with respect to approximation in L1 norm D[1] satisfies D[1]=[12,1]. This is equivalent to the fact that the Minkowski spectrum M, associated with the Minkowski diagonal continued fraction, satisfies M=[14,12]. Further, we show that level sets Θm=\α∈(0,1) Q: m(α)=m\, where m(α) is the Minkowski constant of α, have Hausdorff dimension strictly greater than 1/2 for any m∈(1/4,1/2], while H Θ1/4=12.
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