Counting loxodromics for hyperbolic actions

Gekhtman, Ilya; Taylor, Selwyn; Tiozzo, Giulio

doi:10.1112/topo.12053

Cited by 18 publications

(36 citation statements)

References 68 publications

(98 reference statements)

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“…This implies, by Lemma 6.1, that (19) d π X (p 1 ∪ p 2 ) ≤ 2A + 8C. On the other hand, applying Proposition 2.2.5, we obtain from (16) and (17) (22) and d(x, X), d(y, X) ≤ C. However, this contradicts to the conclusion of Lemma 6.6. Hence, N C (X) ∩ [gx, go] γ ≠ ∅.…”

Section: Almost Geodesic Decompositionmentioning

confidence: 84%

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Genericity of contracting elements in groups

Yang

2018

Math. Ann.

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In this paper, we establish that, for statistically convex-cocompact actions, contracting elements are exponentially generic in counting measure. Among others, the following exponential genericity results are obtained as corollaries for the set of hyperbolic elements in relatively hyperbolic groups, the set of rank-1 elements in CAT(0) groups, and the set of pseudo-Anosov elements in mapping class groups.Regarding a proper action, the set of non-contracting elements is proven to be growthnegligible. In particular, for mapping class groups, the set of pseudo-Anosov elements is generic in a sufficiently large subgroup, provided that the subgroup has purely exponential growth. By Roblin's work, we obtain that the set of hyperbolic elements is generic in any discrete group action on CAT(-1) space with finite BMS measure.Applications to the number of conjugacy classes of non-contracting elements are given for non-rank-1 geodesics in CAT(0) groups with rank-1 elements.Theorem 1.2 (Mod). In mapping class groups, the set of non-pseudo-Anosov elements in a sufficiently large subgroup Γ has growth-negligible. In particular, if Γ has purely exponential growth, then the set of pseudo-Anosov elements is generic.An obvious instance with purely exponential growth is a subclass of sufficiently large subgroups, whose action on Y is itself SCC. This was studied in [40] as SCC subgroups, a dynamical generalization of convex-cocompact subgroups. We emphasize that there exists indeed non-convex-cocompact non-free and free subgroups admiting SCC actions on Teichmüller space. Hence, for these groups, the set of contracting elements is (exponentially) generic.In terms of Theorem 1.2, it would be desirable to investigate which sufficiently large subgroups have purely exponential growth. The similar problem has been completely answered in the setting of Riemannian manifolds with variable negative curvature by work of T. Robin [36]. In fact, his results were obtained in a more general setting. For any proper action on a CAT(-1) space, Roblin showed that the growth of the action is of purely exponential if and only if the corresponding Bowen-Margulis-Sullivan measure is finite on the geodesic flow. From this, we obtain the following application to discrete groups on a CAT(-1) space.Theorem 1.3 (CAT(−1)). Suppose that G acts properly on a CAT(-1) space such that the BMS measure is finite. Then the set of hyperbolic elements is generic.As suggested in Riemannian case, it seems interesting to develop an analogue of Roblin's result for sufficiently large subgroups in mapping class groups.We are now turning to the class of SCC actions, which admits stronger consequence by Theorem A. This class of groups encompasses many interesting clases of groups, listed as in [40]. Again, we first consider the instance of mapping class groups. They are known to act on Teichmüller space by SCC actions a result of by Eskin, Mirzakhani and Rafi [18, Theorem 1.7], as observed in [1, Section 10]. This is the starting point of our approach to mapping class groups,...

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Section: Almost Geodesic Decompositionmentioning

confidence: 84%

“…For instance, partial cases of Theorems 1.7 and 1.9 was obtained there under some automatic hypothesis. Recently, Gehktman, Tylor and Tiozzo [22] estbalished for word metrics the generic elements in a non-elementary hyperbolic group action.…”

Section: 2mentioning

confidence: 99%

Genericity of contracting elements in groups

Yang

2018

Math. Ann.

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“…where P v is the distribution of the Markov chain starting at vertex v, and x n is the n th step. (Lemma 6.2 of [9] explicitly gives this statement where v is the "initial vertex" of the directed graph, however the same argument gives the more general result for all vertices. )…”

Section: Lemma 14mentioning

confidence: 87%

A central limit theorem for random closed geodesics: Proof of the Chas–Li–Maskit conjecture

Gekhtman

Taylor

Tiozzo

2019

Advances in Mathematics

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“…Gekhtman, Taylor and Tiozzo asked the above question in a more general setting. They prove the following theorem in [11]. Let ν denote the Patterson-Sullivan measure obtained as the weak star limit…”

Section: Introductionmentioning

confidence: 99%

“…where δ g denotes the Dirac measure based at g ∈ G and |g| denotes the word length of g. We write [γ ] ∈ ∂G for the element in ∂G that contains γ . Proposition 1.1 (Theorem 1.3 [11]) Suppose a hyperbolic group G has a non-elementary action by isometries on a separable, hyperbolic geodesic metric space X . Then, there is L > 0 such that for every x ∈ X and ν almost every [ γ ] ∈ ∂G,…”

Section: Introductionmentioning

confidence: 99%

Typical behaviour along geodesic rays in hyperbolic groups

Cantrell

2020

Math. Z.

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In this note we study the limiting behaviour of real valued functions on hyperbolic groups as we travel along typical geodesic rays in the Gromov boundary of the group. Our results apply to group homomorphisms, certain quasimorphisms and to the displacement functions associated to convex cocompact group actions on CAT$$(-1)$$ ( - 1 ) metric spaces.

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Counting loxodromics for hyperbolic actions

Cited by 18 publications

References 68 publications

Genericity of contracting elements in groups

Genericity of contracting elements in groups

A central limit theorem for random closed geodesics: Proof of the Chas–Li–Maskit conjecture

Typical behaviour along geodesic rays in hyperbolic groups

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