inf(M \ L)=3

Abstract

The Lagrange and Markov spectra L and M describe the best constants of Diophantine approximations for irrational numbers and binary quadratic forms. In 1880, A. Markov showed that the initial portions of these spectra coincide: indeed, L (0,3) = M (0,3) is a discrete set of explicit quadratic irrationals accumulating only at 3. In this article, we show that the statement above ceases to be true immediately after 3: in particular, L (3,3+)≠ M (3,3+) for all >0, and thus ∈f(M L)=3. In fact, we derive this result as a by-product of lower bounds on the Hausdorff dimension of (M L) (3,3+) implying that 0 H((M L)(3,3+))H(M (3,3+))≥ 12 and, as it turns out, these bounds are obtained from the study of projections of Cartesian products of almost affine dynamical Cantor sets via an argument of probabilistic flavor based on Baker--W\"ustholz theorem on linear forms in logarithms of algebraic numbers.

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