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Limits of geodesic push-forwards of horocycle invariant measures

Published online by Cambridge University Press:  23 October 2020

GIOVANNI FORNI*
Affiliation:
Department of Mathematics, University of Maryland, College Park, MD, USA (e-mail: [email protected])

Abstract

We prove several general conditional convergence results on ergodic averages for horocycle and geodesic subgroups of any continuous $\operatorname {SL}(2, \mathbb {R})$ -action on a locally compact space. These results are motivated by theorems of Eskin, Mirzakhani and Mohammadi on the $\operatorname {SL}(2, \mathbb {R})$ -action on the moduli space of Abelian differentials. By our argument we can derive from these theorems an improved version of the ‘weak convergence’ of push-forwards of horocycle measures under the geodesic flow and a short proof of weaker versions of theorems of Chaika and Eskin on Birkhoff genericity and Oseledets regularity in almost all directions for the Teichmüller geodesic flow.

Type
Original Article
Copyright
© The Author(s), 2020. Published by Cambridge University Press

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References

Bonatti, C., Eskin, A., and Wilkinson, A.. Projective cocycles over $\mathrm{SL}\left(2,\mathbb{R}\right)$ actions: measures invariant under the upper triangular group. Some Aspects of the Theory of Dynamical Systems: A Tribute to Jean-Christophe Yoccoz. Vol. I. Eds. Crovisier, S., Krikorian, R., Matheus, and, C. Senti, S.. Astérisque 415 (2020), 157180.CrossRefGoogle Scholar
Bainbridge, M., Smillie, J., and Weiss, B.. Horocycle dynamics: new invariants and eigenform loci in the stratum $H\left(1,1\right)$ . Preprint, arXiv:1603.00808.Google Scholar
Chaika, J. and Eskin, A.. Every flat surface is Birkhoff and Oseledets generic in almost every direction. J. Mod. Dyn. 9 (2015), 123.CrossRefGoogle Scholar
Eskin, A. and Mirzakhani, M.. Invariant and stationary measures for the $\mathrm{SL}\left(2,\mathbb{R}\right)$ action on moduli space. Publ. Math. Inst. Hautes Études Sci. 127(1) (2018), 95324.CrossRefGoogle Scholar
Eskin, A. and Masur, H.. Pointwise asymptotic formulas on flat surfaces. Ergod. Th. & Dynam. Sys. 21(2) (2001), 443478.CrossRefGoogle Scholar
Eskin, A., Mirzakhani, M., and Mohammadi, A.. Isolation, equidistribution, and orbit closures for the $\mathrm{SL}\left(2,\mathbb{R}\right)$ action on moduli space. Ann. Math. 182 (2015), 673721.CrossRefGoogle Scholar
Filip, S.. Semisimplicity and rigidity of the Kontsevich–Zorich cocycle. Invent. Math. 205(3) (2016), 617670.CrossRefGoogle Scholar
Forni, G., Matheus, C., and Zorich, A.. Lyapunov spectrum of invariant sub-bundles of the Hodge bundle. Ergod. Th. & Dynam. Sys. 34(2) (2012), 353408.CrossRefGoogle Scholar
Forni, G.. Deviation of ergodic averages for area-preserving flows on surfaces of higher genus. Ann. Math. 155(1) (2002), 1103.CrossRefGoogle Scholar
Khalil, O.. Pointwise equidistribution and translates of measures on homogeneous spaces. Ergod. Th. & Dynam. Sys. 40(2) (2020), 453477.CrossRefGoogle Scholar
Minsky, Y. and Weiss, B.. Nondivergence of horocyclic flows on moduli space. J. Reine Angew. Math. (Crelle’s J.) 552 (2002), 131177.Google Scholar
Veech, W.. Siegel measures. Ann. Math. 148(3) (1998), 895944.CrossRefGoogle Scholar