Hausdorff dimension of some subsets of the Lagrange and Markov spectra near 3
Abstract
We study the sets L and M near 3, where L and M are the classical Lagrange and Markov spectra. More specifically, we construct a strictly decreasing sequence \ar\r∈ N converging to 3, such that for any r one can find a subset Br⊂ (ar+1,ar) L' with the property that the Hausdorff dimension of ((ar+1,ar) L) Br is less than the Hausdorff dimension of Br and for t∈ Br the sets of irrational numbers with Lagrange value bounded by t and exactly t respectively, have the same Hausdorff dimension. We also show that, as t varies in Br, this Hausdorff dimension is a strictly increasing function. Finally, in relation to M L, we find C>0 such that we can bound from above the Hausdorff dimension of (M L) (-∞,3+) by ( )- (( ))+C if >0 is small.
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