A global shadow lemma for relatively Morse groups in higher rank

Dongryul M. Kim; Hee Oh

arxiv: 2606.19779 · v1 · pith:MYKDNXJRnew · submitted 2026-06-18 · 🧮 math.GT · math.DS· math.GR

A global shadow lemma for relatively Morse groups in higher rank

Dongryul M. Kim , Hee Oh This is my paper

Pith reviewed 2026-06-26 15:34 UTC · model grok-4.3

classification 🧮 math.GT math.DSmath.GR

keywords Patterson-Sullivan measuresshadow lemmarelatively Morse subgroupshigher-rank semisimple Lie groupsGromov modelHausdorff measurevisual quasi-metriccuspidal regions

0 comments

The pith

Patterson-Sullivan measures for relatively Morse subgroups satisfy a uniform global shadow lemma across the entire Gromov model, including cusps.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper proves a global shadow lemma giving uniform estimates for the mass that Patterson-Sullivan measures assign to shadows, no matter where the center point sits in the Gromov model. The uniformity continues to hold when centers lie deep inside cuspidal regions, extending earlier results known only for geometrically finite real hyperbolic groups. A sympathetic reader would care because the estimates describe the distribution of group orbits near the boundary in a controlled and location-independent way. From the lemma follow uniform local estimates on the measures and sufficient conditions for the measures to coincide, up to scale, with the Hausdorff measure coming from the visual quasi-metric. The work therefore supplies a basic comparison tool for discrete actions on higher-rank spaces.

Core claim

We prove a global shadow lemma for Patterson-Sullivan measures associated to relatively Morse subgroups of higher-rank semisimple Lie groups. The estimate is uniform for shadows centered at arbitrary points in a Gromov model, including points deep in the cuspidal part. This extends the global shadow lemma of Stratmann-Velani for geometrically finite real hyperbolic groups. As applications, we obtain uniform local estimates for Patterson-Sullivan measures, and we give sufficient conditions under which these measures agree, up to scale, with the Hausdorff measure defined by the associated visual quasi-metric.

What carries the argument

The global shadow lemma, which supplies a location-independent bound on the Patterson-Sullivan measure of any shadow set in the Gromov model.

If this is right

Uniform local estimates for Patterson-Sullivan measures hold at every scale and location.
Under the stated conditions the measures coincide up to scale with the Hausdorff measure induced by the visual quasi-metric.
The estimates remain valid for shadows centered at arbitrary points, including those deep inside cusps.
The lemma applies directly to any relatively Morse subgroup of a higher-rank semisimple Lie group.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The uniformity may allow direct comparison of local dimensions of the measures at cuspidal and non-cuspidal points.
The same shadow-control technique could be tested on other boundary measures once an analogous Gromov model is available.
Agreement with Hausdorff measure would immediately give explicit dimension formulas for the limit sets of these subgroups.

Load-bearing premise

The subgroups are relatively Morse and the ambient higher-rank semisimple Lie groups admit a Gromov model in which Patterson-Sullivan measures are defined.

What would settle it

A sequence of shadows whose centers move deeper into a cusp, yet whose Patterson-Sullivan measures grow or shrink by an unbounded factor relative to the shadow size, would violate the claimed uniformity.

read the original abstract

Patterson-Sullivan measures encode the distribution of orbits of discrete group actions near the boundary. In this paper, we prove a global shadow lemma for Patterson-Sullivan measures associated to relatively Morse subgroups of higher-rank semisimple Lie groups. The estimate is uniform for shadows centered at arbitrary points in a Gromov model, including points deep in the cuspidal part. This extends the global shadow lemma of Stratmann-Velani for geometrically finite real hyperbolic groups. As applications, we obtain uniform local estimates for Patterson-Sullivan measures, and we give sufficient conditions under which these measures agree, up to scale, with the Hausdorff measure defined by the associated visual quasi-metric.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

This extends the global shadow lemma to Patterson-Sullivan measures for relatively Morse subgroups in higher-rank groups, with uniformity claimed even deep in cusps, but the abstract gives no proof steps to check.

read the letter

The main claim is a uniform global shadow lemma for Patterson-Sullivan measures on relatively Morse subgroups of higher-rank semisimple Lie groups. The estimate is supposed to hold for shadows centered anywhere in the Gromov model, including points deep in the cuspidal part. This is framed as a direct extension of the Stratmann-Velani result that was known for geometrically finite real hyperbolic groups.

What the paper does is state the result cleanly and list two applications: uniform local estimates for the measures, and sufficient conditions for them to agree up to scale with the Hausdorff measure coming from the visual quasi-metric. The relatively Morse hypothesis is presented as the key ingredient that makes the higher-rank and cuspidal uniformity work.

The soft spot is that the abstract contains no lemmas, no outline of the argument, and no indication of how the cuspidal uniformity is obtained. Without those steps it is impossible to see whether the extension actually goes through or whether extra controls are needed beyond what works in rank one. The soundness cannot be checked from the given text.

This is a narrow technical tool for people already working on boundary measures and dynamics for higher-rank discrete groups. A reader outside that subfield will not get much from it. The citation pattern is standard and does not raise flags.

I would send it to referees. The statement is concrete and the setting is well-defined, so a serious check of the proof is worth the time even if revisions are needed.

Referee Report

0 major / 1 minor

Summary. The manuscript proves a global shadow lemma for Patterson-Sullivan measures associated to relatively Morse subgroups of higher-rank semisimple Lie groups. The estimate is uniform for shadows centered at arbitrary points in a Gromov model, including points deep in the cuspidal part. This extends the global shadow lemma of Stratmann-Velani for geometrically finite real hyperbolic groups. As applications, the paper obtains uniform local estimates for Patterson-Sullivan measures and gives sufficient conditions under which these measures agree, up to scale, with the Hausdorff measure defined by the associated visual quasi-metric.

Significance. If the result holds, the uniform global shadow lemma would be a useful technical tool in the study of boundary dynamics and Patterson-Sullivan measures for discrete subgroups in higher-rank Lie groups. The extension beyond the classical hyperbolic case, together with the claimed uniformity deep in cusps, would support applications to local dimension estimates and comparisons between Patterson-Sullivan and Hausdorff measures on the boundary.

minor comments (1)

The abstract refers to the 'Gromov model' and 'relatively Morse' hypothesis without a self-contained definition or reference to the precise statement used; adding a short paragraph recalling these notions in §1 would improve readability for readers outside the immediate subfield.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their summary of the manuscript. The recommendation is listed as uncertain, but the report contains no specific major comments or questions to address. We are prepared to respond to any concrete concerns if they are provided.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper claims a global shadow lemma for Patterson-Sullivan measures on relatively Morse subgroups of higher-rank semisimple Lie groups, presented explicitly as an extension of the independent Stratmann-Velani result for geometrically finite real hyperbolic groups. The abstract and reader's summary indicate the result follows from the relatively Morse hypothesis together with standard existence of Patterson-Sullivan measures and the Gromov model; no self-definitional steps, fitted inputs renamed as predictions, or load-bearing self-citations appear in the stated theorem. The derivation chain is therefore self-contained against external benchmarks and prior independent work.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Only the abstract is available; the paper relies on standard domain assumptions from geometric group theory and Lie group dynamics that are not detailed here.

axioms (1)

domain assumption Patterson-Sullivan measures exist and are well-defined for the relatively Morse subgroups in question
Invoked implicitly as the objects to which the lemma applies (abstract).

pith-pipeline@v0.9.1-grok · 5639 in / 1142 out tokens · 26069 ms · 2026-06-26T15:34:12.731022+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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S. Patterson. The limit set of a Fuchsian group.Acta Math., 136(3-4):241–273, 1976

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D. Sullivan. The density at infinity of a discrete group of hyperbolic motions.Inst. Hautes ´Etudes Sci. Publ. Math., (50):171–202, 1979

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D. Sullivan. Entropy, Hausdorff measures old and new, and limit sets of geometrically finite Kleinian groups.Acta Math., 153(3-4):259–277, 1984

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P. Tukia. On isomorphisms of geometrically finite M¨ obius groups.Inst. Hautes´Etudes Sci. Publ. Math., (61):171–214, 1985

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A. Yaman. A topological characterisation of relatively hyperbolic groups.J. Reine Angew. Math., 566:41–89, 2004. A GLOBAL SHADOW LEMMA IN HIGHER RANK 45

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Zhu and A

F. Zhu and A. Zimmer. Relatively Anosov representations via flows I: theory.Preprint, arXiv:2207.14737, 2022. To appear in Groups Geom. Dyn

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Zhu and A

F. Zhu and A. Zimmer. Relatively Anosov representations via flows II: Examples.J. Lond. Math. Soc. (2), 109(6):Paper No. e12949, 61, 2024. Department of Mathematics, Yale University, New Haven, CT 06511 Email address:dongryul.kim97@gmail.com Department of Mathematics, Yale University, New Haven, CT 06511 Email address:hee.oh@yale.edu

2024

[1] [1]

Y. Benoist. Propri´ et´ es asymptotiques des groupes lin´ eaires.Geom. Funct. Anal., 7(1):1–47, 1997

1997

[2] [2]

Benoist and H

Y. Benoist and H. Oh. Effective equidistribution ofS-integral points on symmetric varieties.Ann. Inst. Fourier (Grenoble), 62(5):1889–1942, 2012

1942

[3] [3]

Bowditch

B. Bowditch. A topological characterisation of hyperbolic groups.J. Amer. Math. Soc., 11(3):643–667, 1998. 44 DONGRYUL M. KIM AND HEE OH

1998

[4] [4]

Bowditch

B. Bowditch. Convergence groups and configuration spaces. InGeometric group theory down under (Canberra, 1996), pages 23–54. de Gruyter, Berlin, 1999

1996

[5] [5]

Bowditch

B. Bowditch. Relatively hyperbolic groups.Internat. J. Algebra Comput., 22(3):1250016, 66, 2012

2012

[6] [6]

Bray and G

H. Bray and G. Tiozzo. A global shadow lemma and logarithm law for geometrically finite Hilbert geometries.arXiv preprint arXiv:2111.04618, 2021

arXiv 2021

[7] [7]

Canary, T

R. Canary, T. Zhang, and A. Zimmer. Cusped Hitchin representations and Anosov representations of geometrically finite Fuchsian groups.Adv. Math., 404(part B):Paper No. 108439, 67, 2022

2022

[8] [8]

Canary, T

R. Canary, T. Zhang, and A. Zimmer. Patterson-Sullivan measures for relatively Anosov groups.Math. Ann., 392(2):2309–2363, 2025

2025

[9] [9]

T. Das, D. Simmons, and M. Urba´ nski. Tukia’s isomorphism theorem in CAT(−1) spaces.Ann. Acad. Sci. Fenn. Math., 41(2):659–680, 2016

2016

[10] [10]

Dey and M

S. Dey and M. Kapovich. Patterson-Sullivan theory for Anosov subgroups.Trans. Amer. Math. Soc., 375(12):8687–8737, 2022

2022

[11] [11]

S. Dey, D. M. Kim, and H. Oh. Ahlfors regularity of Patterson-Sullivan measures of Anosov groups and applications.arXiv preprint arXiv:2401.12398, To appear in Compos. Math

arXiv

[12] [12]

Falconer.Fractal geometry

K. Falconer.Fractal geometry. John Wiley & Sons, Ltd., Chichester, third edition,

[13] [13]

Mathematical foundations and applications

[14] [14]

Kapovich and B

M. Kapovich and B. Leeb. Relativizing characterizations of Anosov subgroups, I. Groups Geom. Dyn., 17(3):1005–1071, 2023. With an appendix by Gregory A. Soifer

2023

[15] [15]

Kapovich, B

M. Kapovich, B. Leeb, and J. Porti. A Morse lemma for quasigeodesics in symmetric spaces and Euclidean buildings.Geom. Topol., 22(7):3827–3923, 2018

2018

[16] [16]

D. M. Kim. Conformal measure rigidity and ergodicity of horospherical foliations. arXiv preprint arXiv:2404.13727, 2024

arXiv 2024

[17] [17]

D. M. Kim and H. Oh. Relatively Anosov groups: finiteness, measure of maximal entropy, and reparameterization.J. Reine Angew. Math., 826:91–142, 2025

2025

[18] [18]

D. M. Kim, H. Oh, and Y. Wang. Properly discontinuous actions, growth indicators, and conformal measures for transverse subgroups.Math. Ann., 393(2):2391–2450, 2025

2025

[19] [19]

Lee and H

M. Lee and H. Oh. Invariant measures for horospherical actions and Anosov groups. Int. Math. Res. Not. IMRN, (19):16226–16295, 2023

2023

[20] [20]

Papageorgiou

E. Papageorgiou. Surjectivity of convolution operators on harmonicN Agroups.J. Geom. Anal., 35(1):Paper No. 7, 31, 2025

2025

[21] [21]

Patterson

S. Patterson. The limit set of a Fuchsian group.Acta Math., 136(3-4):241–273, 1976

1976

[22] [22]

J.-F. Quint. Mesures de Patterson-Sullivan en rang sup´ erieur.Geom. Funct. Anal., 12(4):776–809, 2002

2002

[23] [23]

Rouvi` ere

F. Rouvi` ere. Espaces de Damek-Ricci, g´ eom´ etrie et analyse. InAnalyse sur les groupes de Lie et th´ eorie des repr´ esentations (K´ enitra, 1999), volume 7 ofS´ emin. Congr., pages 45–100. Soc. Math. France, Paris, 2003

1999

[24] [24]

Stratmann and S

B. Stratmann and S. L. Velani. The Patterson measure for geometrically finite groups with parabolic elements, new and old.Proc. London Math. Soc. (3), 71(1):197–220, 1995

1995

[25] [25]

Sullivan

D. Sullivan. The density at infinity of a discrete group of hyperbolic motions.Inst. Hautes ´Etudes Sci. Publ. Math., (50):171–202, 1979

1979

[26] [26]

Sullivan

D. Sullivan. Entropy, Hausdorff measures old and new, and limit sets of geometrically finite Kleinian groups.Acta Math., 153(3-4):259–277, 1984

1984

[27] [27]

P. Tukia. On isomorphisms of geometrically finite M¨ obius groups.Inst. Hautes´Etudes Sci. Publ. Math., (61):171–214, 1985

1985

[28] [28]

A. Yaman. A topological characterisation of relatively hyperbolic groups.J. Reine Angew. Math., 566:41–89, 2004. A GLOBAL SHADOW LEMMA IN HIGHER RANK 45

2004

[29] [29]

Zhu and A

F. Zhu and A. Zimmer. Relatively Anosov representations via flows I: theory.Preprint, arXiv:2207.14737, 2022. To appear in Groups Geom. Dyn

arXiv 2022

[30] [30]

Zhu and A

F. Zhu and A. Zimmer. Relatively Anosov representations via flows II: Examples.J. Lond. Math. Soc. (2), 109(6):Paper No. e12949, 61, 2024. Department of Mathematics, Yale University, New Haven, CT 06511 Email address:dongryul.kim97@gmail.com Department of Mathematics, Yale University, New Haven, CT 06511 Email address:hee.oh@yale.edu

2024