Geodesic
The Manhattan curve, ergodic theory of topological flows and rigidity
Cantrell, Stephen1 ; Tanaka, Ryokichi2
1Department of Mathematics, University of Warwick, Coventry, United Kingdom
2Department of Mathematics, Kyoto University, Kyoto, Japan
Geometry & topology, Tome 29 (2025) no. 4, pp. 1851-1907
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For every nonelementary hyperbolic group, we introduce the Manhattan curve associated to each pair of left-invariant hyperbolic metrics which are quasi-isometric to a word metric. It is convex; we show that it is continuously differentiable and moreover is a straight line if and only if the corresponding two metrics are roughly similar, ie they are within bounded distance after multiplying by a positive constant. Further, we prove that the Manhattan curve associated to two strongly hyperbolic metrics is twice continuously differentiable. The proof is based on the ergodic theory of topological flows associated to general hyperbolic groups and analyzing the multifractal structure of Patterson–Sullivan measures. We exhibit some explicit examples including a hyperbolic triangle group and compute the exact value of the mean distortion for pairs of word metrics.

DOI : 10.2140/gt.2025.29.1851
Keywords: hyperbolic group, the Manhattan curve, Patterson–Sullivan measure, symbolic dynamics, Hausdorff dimension

Cantrell, Stephen  1   ; Tanaka, Ryokichi  2

1 Department of Mathematics, University of Warwick, Coventry, United Kingdom
2 Department of Mathematics, Kyoto University, Kyoto, Japan 
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Cantrell, Stephen; Tanaka, Ryokichi. The Manhattan curve, ergodic theory of topological flows and rigidity. Geometry & topology, Tome 29 (2025) no. 4, pp. 1851-1907. doi: 10.2140/gt.2025.29.1851

[1] G N Arzhantseva, I G Lysenok, Growth tightness for word hyperbolic groups, Math. Z. 241 (2002) 597 | DOI

[2] U Bader, A Furman, Some ergodic properties of metrics on hyperbolic groups, preprint (2017)

[3] S Blachère, P Haïssinsky, P Mathieu, Harmonic measures versus quasiconformal measures for hyperbolic groups, Ann. Sci. École Norm. Sup. 44 (2011) 683 | DOI

[4] M Bonk, O Schramm, Embeddings of Gromov hyperbolic spaces, Geom. Funct. Anal. 10 (2000) 266 | DOI

[5] A Boulanger, P Mathieu, C Sert, A Sisto, Large deviations for random walks on Gromov-hyperbolic spaces, Ann. Sci. École Norm. Sup. 56 (2023) 885 | DOI

[6] B H Bowditch, Convergence groups and configuration spaces, from: "Geometric group theory down under", de Gruyter (1999) 23 | DOI

[7] H Bray, R Canary, L Y Kao, G Martone, Counting, equidistribution and entropy gaps at infinity with applications to cusped Hitchin representations, J. Reine Angew. Math. 791 (2022) 1 | DOI

[8] M Burger, Intersection, the Manhattan curve, and Patterson–Sullivan theory in rank 2, Int. Math. Res. Not. 1993 (1993) 217 | DOI

[9] D Calegari, scl, 20, Math. Soc. Japan (2009) | DOI

[10] D Calegari, The ergodic theory of hyperbolic groups, from: "Geometry and topology down under", Contemp. Math. 597, Amer. Math. Soc. (2013) 15 | DOI

[11] J W Cannon, The combinatorial structure of cocompact discrete hyperbolic groups, Geom. Dedicata 16 (1984) 123 | DOI

[12] S Cantrell, Statistical limit laws for hyperbolic groups, Trans. Amer. Math. Soc. 374 (2021) 2687 | DOI

[13] M Coornaert, Mesures de Patterson–Sullivan sur le bord d’un espace hyperbolique au sens de Gromov, Pacific J. Math. 159 (1993) 241 | DOI

[14] M Coornaert, G Knieper, Growth of conjugacy classes in Gromov hyperbolic groups, Geom. Funct. Anal. 12 (2002) 464 | DOI

[15] A Dembo, O Zeitouni, Large deviations techniques and applications, 38, Springer (1998) | DOI

[16] S Friedland, Limit eigenvalues of nonnegative matrices, Linear Algebra Appl. 74 (1986) 173 | DOI

[17] A Furman, Coarse-geometric perspective on negatively curved manifolds and groups, from: "Rigidity in dynamics and geometry", Springer (2002) 149 | DOI

[18] G Group, GAP: groups, algorithms, and programming (2020)

[19] I Gekhtman, S J Taylor, G Tiozzo, Counting loxodromics for hyperbolic actions, J. Topol. 11 (2018) 379 | DOI

[20] I Gekhtman, S J Taylor, G Tiozzo, Central limit theorems for counting measures in coarse negative curvature, Compos. Math. 158 (2022) 1980 | DOI

[21] É Ghys, P De La Harpe, editors, Sur les groupes hyperboliques d’après Mikhael Gromov, 83, Birkhäuser (1990) | DOI

[22] S Gouëzel, Local limit theorem for symmetric random walks in Gromov-hyperbolic groups, J. Amer. Math. Soc. 27 (2014) 893 | DOI

[23] S Gouëzel, F Mathéus, F Maucourant, Entropy and drift in word hyperbolic groups, Invent. Math. 211 (2018) 1201 | DOI

[24] M Gromov, Hyperbolic groups, from: "Essays in group theory" (editor S M Gersten), Math. Sci. Res. Inst. Publ. 8, Springer (1987) 75 | DOI

[25] J Heinonen, Lectures on analysis on metric spaces, Springer (2001) | DOI

[26] V A Kaimanovich, Invariant measures of the geodesic flow and measures at infinity on negatively curved manifolds, Ann. Inst. H. Poincaré Phys. Théor. 53 (1990) 361

[27] V Kaimanovich, I Kapovich, P Schupp, The subadditive ergodic theorem and generic stretching factors for free group automorphisms, Israel J. Math. 157 (2007) 1 | DOI

[28] L Y Kao, Manhattan curves for hyperbolic surfaces with cusps, Ergodic Theory Dynam. Systems 40 (2020) 1843 | DOI

[29] G Knieper, Das Wachstum der Äquivalenzklassen geschlossener Geodätischer in kompakten Mannigfaltigkeiten, Arch. Math. (Basel) 40 (1983) 559 | DOI

[30] J Maher, G Tiozzo, Random walks on weakly hyperbolic groups, J. Reine Angew. Math. 742 (2018) 187 | DOI

[31] I Mineyev, Flows and joins of metric spaces, Geom. Topol. 9 (2005) 403 | DOI

[32] B Nica, J Špakula, Strong hyperbolicity, Groups Geom. Dyn. 10 (2016) 951 | DOI

[33] W Parry, M Pollicott, Zeta functions and the periodic orbit structure of hyperbolic dynamics, 187-188, Soc. Math. France (1990) 268

[34] C Series, The infinite word problem and limit sets in Fuchsian groups, Ergodic Theory Dynam. Systems 1 (1981) 337 | DOI

[35] R Sharp, The Manhattan curve and the correlation of length spectra on hyperbolic surfaces, Math. Z. 228 (1998) 745 | DOI

[36] R Sharp, Distortion and entropy for automorphisms of free groups, Discrete Contin. Dyn. Syst. 26 (2010) 347 | DOI

[37] K Sigmund, Generic properties of invariant measures for Axiom A diffeomorphisms, Invent. Math. 11 (1970) 99 | DOI

[38] R Tanaka, Hausdorff spectrum of harmonic measure, Ergodic Theory Dynam. Systems 37 (2017) 277 | DOI

[39] R Tanaka, Topological flows for hyperbolic groups, Ergodic Theory Dynam. Systems 41 (2021) 3474 | DOI

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