On the geometry of the second Lagrange spectra

Abstract

The Lagrange spectrum L is the set of finite values of the best approximation constants k(α)=|p|,|q| ∞|q(qα-p)|-1, where α∈ R Q. It is a classical result that the pairs (p,q) attaining these approximation constants arise from the convergents (pn,qn) of the continued fraction of α. Consequently, k(α)=n∞|qn(qnα-pn)|-1. Moreira proved that the function d(t)=HD(L(-∞,t)) where HD denotes Hausdorff dimension, is continuous. Second Lagrange spectra are defined analogously to the classical Lagrange spectrum, but are associated with the problem of approximating an irrational number α by rational numbers pq that are not convergents of its continued fraction expansion. Two natural definitions arise depending on whether rational multiples (p,q)=(kpn,kqn),k≥ 2 which represent the same rational numbers as convergents, are allowed or excluded. Based on this distinction, Moshchevitin introduced two second Lagrange spectra, denoted L2 and L2*. We prove that the function d2(t)=HD(L2 (-∞,t)) is continuous, whereas d2*(t)=HD(L2* (-∞,t)) is discontinuous and assumes only the values 0 and 1.