Persistent Hall rays for Lagrange spectra at cusps of Riemann surfaces

Abstract: We study Lagrange spectra at cusps of finite area Riemann surfaces. These spectra are penetration spectra that describe the asymptotic depths of penetration of geodesics in the cusps. Their study is in particular motivated by Diophantine approximation on Fuchsian groups. In the classical case of the modular surface and classical Diophantine approximation, Hall proved in 1947 that the classical Lagrange spectrum contains a half-line, known as a Hall ray. We generalize this result to the context of Riema… Show more

“…We follow [6,Section 3], which is based on [1,Section 2.4] and [2,Section 2]. The original construction is the Markov map in [3], which is orbit equivalent to the action of a given finitely generated Fuchsian group of the first kind.…”

“…that is, the n + 1 arcs above share ξ W as common end point (see also [2,Section 2.4] and [1, Section 4.3]). A sequence (a n ) n∈N is called cuspidal if any initial factor (a 0 , .…”

“…This result is used in [6] to approximate the dimension of sets of badly approximable points by the dimension of dynamically defined regular Cantor sets. The study of the higher part of the Markov and Lagrange spectra is also a natural application, in the spirit of [1,2,11].…”

“…of a real number α, where the symbols W r for r ≥ 1 are cuspidal words which belong to a countable alphabet W (definitions are in Sections 2 and 3). Cuspidal words W ∈ W, introduced in [1,2], label a subset of elements {G W : W ∈ W} of Γ, which generalise the role played in the theory of classical continued fractions by the matrices 1 a 2k+1 0 1 and 1 0 a 2k 1 with a 2k , a 2k+1 ∈ N * for any k ∈ N.…”

On Good Approximations and the Bowen–series Expansion

“…We follow [6,Section 3], which is based on [1,Section 2.4] and [2,Section 2]. The original construction is the Markov map in [3], which is orbit equivalent to the action of a given finitely generated Fuchsian group of the first kind.…”

“…that is, the n + 1 arcs above share ξ W as common end point (see also [2,Section 2.4] and [1, Section 4.3]). A sequence (a n ) n∈N is called cuspidal if any initial factor (a 0 , .…”

“…This result is used in [6] to approximate the dimension of sets of badly approximable points by the dimension of dynamically defined regular Cantor sets. The study of the higher part of the Markov and Lagrange spectra is also a natural application, in the spirit of [1,2,11].…”

“…of a real number α, where the symbols W r for r ≥ 1 are cuspidal words which belong to a countable alphabet W (definitions are in Sections 2 and 3). Cuspidal words W ∈ W, introduced in [1,2], label a subset of elements {G W : W ∈ W} of Γ, which generalise the role played in the theory of classical continued fractions by the matrices 1 a 2k+1 0 1 and 1 0 a 2k 1 with a 2k , a 2k+1 ∈ N * for any k ∈ N.…”

On Good Approximations and the Bowen–series Expansion

“…A first use of gap conditions appears in [7] and a more recent application in [3]. A gap condition is used for the product of Cantor sets in [10], and for Lipschitz perturbations of S(•, •) in Theorem 1.12 in [1]. Similar ideas are used also in § 2.2 and § 2.3 of this paper, inspired by [2].…”

On the measure of products from the middle-third Cantor set

On the measure of products from the middle-third Cantor set