Geodesic
Eigenvalues of curvature, Lyapunov exponents and Harder–Narasimhan filtrations
Yu, Fei1
1 School of Mathematical Sciences, Zhejiang University, Hangzhou, China
Geometry & topology, Tome 22 (2018) no. 4, pp. 2253-2298.

Voir la notice de l'article provenant de la source Mathematical Sciences Publishers

Inspired by the Katz–Mazur theorem on crystalline cohomology and by the numerical experiments of Eskin, Kontsevich and Zorich, we conjecture that the polygon of the Lyapunov spectrum lies above (or on) the Harder–Narasimhan polygon of the Hodge bundle over any Teichmüller curve. We also discuss the connections between the two polygons and the integral of eigenvalues of the curvature of the Hodge bundle by using the works of Atiyah and Bott, Forni, and Möller. We obtain several applications to Teichmüller dynamics conditional on the conjecture.

DOI : 10.2140/gt.2018.22.2253
Classification : 14H10, 30F60, 32G15, 37D25, 53C07
Keywords: moduli space of Riemann surface, Teichmüller geodesic flow, eigenvalue of curvature, Lyapunov exponent, Harder–Narasimhan filtration

Yu, Fei 1

1 School of Mathematical Sciences, Zhejiang University, Hangzhou, China 
@article{GT_2018_22_4_a7,
     author = {Yu, Fei},
     title = {Eigenvalues of curvature, {Lyapunov} exponents and {Harder{\textendash}Narasimhan} filtrations},
     journal = {Geometry & topology},
     pages = {2253--2298},
     publisher = {mathdoc},
     volume = {22},
     number = {4},
     year = {2018},
     doi = {10.2140/gt.2018.22.2253},
     url = {http://geodesic.mathdoc.fr/articles/10.2140/gt.2018.22.2253/}
}
TY  - JOUR
AU  - Yu, Fei
TI  - Eigenvalues of curvature, Lyapunov exponents and Harder–Narasimhan filtrations
JO  - Geometry & topology
PY  - 2018
SP  - 2253
EP  - 2298
VL  - 22
IS  - 4
PB  - mathdoc
UR  - http://geodesic.mathdoc.fr/articles/10.2140/gt.2018.22.2253/
DO  - 10.2140/gt.2018.22.2253
ID  - GT_2018_22_4_a7
ER  - 
%0 Journal Article
%A Yu, Fei
%T Eigenvalues of curvature, Lyapunov exponents and Harder–Narasimhan filtrations
%J Geometry & topology
%D 2018
%P 2253-2298
%V 22
%N 4
%I mathdoc
%U http://geodesic.mathdoc.fr/articles/10.2140/gt.2018.22.2253/
%R 10.2140/gt.2018.22.2253
%F GT_2018_22_4_a7
Yu, Fei. Eigenvalues of curvature, Lyapunov exponents and Harder–Narasimhan filtrations. Geometry & topology, Tome 22 (2018) no. 4, pp. 2253-2298. doi : 10.2140/gt.2018.22.2253. http://geodesic.mathdoc.fr/articles/10.2140/gt.2018.22.2253/

[1] Y André, Slope filtrations, Confluentes Math. 1 (2009) 1 | DOI

[2] M F Atiyah, R Bott, The Yang–Mills equations over Riemann surfaces, Philos. Trans. Roy. Soc. London Ser. A 308 (1983) 523 | DOI

[3] A Avila, M Viana, Simplicity of Lyapunov spectra : proof of the Zorich–Kontsevich conjecture, Acta Math. 198 (2007) 1 | DOI

[4] M Bainbridge, Euler characteristics of Teichmüller curves in genus two, Geom. Topol. 11 (2007) 1887 | DOI

[5] M Bainbridge, P Habegger, M Möller, Teichmüller curves in genus three and just likely intersections in Gmn × Gan, Publ. Math. Inst. Hautes Études Sci. 124 (2016) 1 | DOI

[6] W P Barth, K Hulek, C A M Peters, A Van De Ven, Compact complex surfaces, 4, Springer (2004) | DOI

[7] C Bonatti, A Eskin, A Wilkinson, Projective cocycles over SL(2, R) actions : measures invariant under the upper triangular group, preprint (2017)

[8] I I Bouw, M Möller, Teichmüller curves, triangle groups, and Lyapunov exponents, Ann. of Math. 172 (2010) 139 | DOI

[9] D Chen, M Möller, Nonvarying sums of Lyapunov exponents of Abelian differentials in low genus, Geom. Topol. 16 (2012) 2427 | DOI

[10] D Chen, M Möller, Quadratic differentials in low genus: exceptional and non-varying strata, Ann. Sci. Éc. Norm. Supér. 47 (2014) 309 | DOI

[11] V Delecroix, P Hubert, S Lelièvre, Diffusion for the periodic wind-tree model, Ann. Sci. Éc. Norm. Supér. 47 (2014) 1085 | DOI

[12] A Eskin, M Kontsevich, M Möller, A Zorich, Lower bounds for Lyapunov exponents of flat bundles on curves, Geom. Topol. 22 (2018) 2299 | DOI

[13] A Eskin, M Kontsevich, A Zorich, Lyapunov spectrum of square-tiled cyclic covers, J. Mod. Dyn. 5 (2011) 319 | DOI

[14] A Eskin, M Kontsevich, A Zorich, Sum of Lyapunov exponents of the Hodge bundle with respect to the Teichmüller geodesic flow, Publ. Math. Inst. Hautes Études Sci. 120 (2014) 207 | DOI

[15] A Eskin, M Mirzakhani, Invariant and stationary measures for the SL(2, R) action on moduli space, preprint (2013)

[16] A Eskin, M Mirzakhani, A Mohammadi, Isolation, equidistribution, and orbit closures for the SL(2, R) action on moduli space, Ann. of Math. 182 (2015) 673 | DOI

[17] S Filip, Semisimplicity and rigidity of the Kontsevich–Zorich cocycle, Invent. Math. 205 (2016) 617 | DOI

[18] S Filip, Splitting mixed Hodge structures over affine invariant manifolds, Ann. of Math. 183 (2016) 681 | DOI

[19] G Forni, Deviation of ergodic averages for area-preserving flows on surfaces of higher genus, Ann. of Math. 155 (2002) 1 | DOI

[20] G Forni, C Matheus, A Zorich, Square-tiled cyclic covers, J. Mod. Dyn. 5 (2011) 285 | DOI

[21] G Forni, C Matheus, A Zorich, Lyapunov spectrum of invariant subbundles of the Hodge bundle, Ergodic Theory Dynam. Systems 34 (2014) 353 | DOI

[22] E Goujard, A criterion for being a Teichmüller curve, Math. Res. Lett. 19 (2012) 847 | DOI

[23] G Harder, M S Narasimhan, On the cohomology groups of moduli spaces of vector bundles on curves, Math. Ann. 212 (1974/75) 215 | DOI

[24] A Horn, Doubly stochastic matrices and the diagonal of a rotation matrix, Amer. J. Math. 76 (1954) 620 | DOI

[25] D Huybrechts, M Lehn, The geometry of moduli spaces of sheaves, E31, Vieweg (1997)

[26] J Kollár, Subadditivity of the Kodaira dimension : fibers of general type, from: "Algebraic geometry" (editor T Oda), Adv. Stud. Pure Math. 10, North-Holland, Amsterdam (1987) 361

[27] M Kontsevich, Lyapunov exponents and Hodge theory, from: "The mathematical beauty of physics" (editors J M Drouffe, J B Zuber), Adv. Ser. Math. Phys. 24, World Scientific (1997) 318 | DOI

[28] M Kontsevich, Kähler random walk and Lyapunov exponents, video-recorded lecture (2013)

[29] M Kontsevich, A Zorich, Lyapunov exponents and Hodge theory, preprint (1997)

[30] M Kontsevich, A Zorich, Connected components of the moduli spaces of Abelian differentials with prescribed singularities, Invent. Math. 153 (2003) 631 | DOI

[31] H Masur, Interval exchange transformations and measured foliations, Ann. of Math. 115 (1982) 169 | DOI

[32] H Masur, M Möller, A Zorich, Flat surfaces and dynamics on moduli space, Oberwolfach report (2014)

[33] C Matheus, M Möller, J C Yoccoz, A criterion for the simplicity of the Lyapunov spectrum of square-tiled surfaces, Invent. Math. 202 (2015) 333 | DOI

[34] B Mazur, Frobenius and the Hodge filtration, Bull. Amer. Math. Soc. 78 (1972) 653 | DOI

[35] B Mazur, Frobenius and the Hodge filtration (estimates), Ann. of Math. 98 (1973) 58 | DOI

[36] C T Mcmullen, Teichmüller curves in genus two : torsion divisors and ratios of sines, Invent. Math. 165 (2006) 651 | DOI

[37] M Möller, Variations of Hodge structures of a Teichmüller curve, J. Amer. Math. Soc. 19 (2006) 327 | DOI

[38] M Möller, Teichmüller curves, mainly from the viewpoint of algebraic geometry, from: "Moduli spaces of Riemann surfaces" (editors B Farb, R Hain, E Looijenga), IAS/Park City Math. Ser. 20, Amer. Math. Soc. (2013) 267 | DOI

[39] C T Simpson, Constructing variations of Hodge structure using Yang–Mills theory and applications to uniformization, J. Amer. Math. Soc. 1 (1988) 867 | DOI

[40] W A Veech, Gauss measures for transformations on the space of interval exchange maps, Ann. of Math. 115 (1982) 201 | DOI

[41] W A Veech, Teichmüller curves in moduli space, Eisenstein series and an application to triangular billiards, Invent. Math. 97 (1989) 553 | DOI

[42] E Viehweg, K Zuo, A characterization of certain Shimura curves in the moduli stack of abelian varieties, J. Differential Geom. 66 (2004) 233 | DOI

[43] A Wright, Schwarz triangle mappings and Teichmüller curves : abelian square-tiled surfaces, J. Mod. Dyn. 6 (2012) 405 | DOI

[44] A Wright, Schwarz triangle mappings and Teichmüller curves : the Veech–Ward–Bouw–Möller curves, Geom. Funct. Anal. 23 (2013) 776 | DOI

[45] F Yu, Lyapunov exponents and Harder–Narasimhan filtrations on Teichmüller curves, conference talk (2014)

[46] F Yu, K Zuo, Weierstrass filtration on Teichmüller curves and Lyapunov exponents : upper bounds, preprint (2012)

[47] F Yu, K Zuo, Weierstrass filtration on Teichmüller curves and Lyapunov exponents, J. Mod. Dyn. 7 (2013) 209 | DOI

[48] A Zorich, Asymptotic flag of an orientable measured foliation on a surface, from: "Geometric study of foliations" (editors T Mizutani, K Masuda, S Matsumoto, T Inaba, T Tsuboi, Y Mitsumatsu), World Scientific (1994) 479 | DOI

[49] A Zorich, Finite Gauss measure on the space of interval exchange transformations : Lyapunov exponents, Ann. Inst. Fourier Grenoble 46 (1996) 325

[50] A Zorich, Flat surfaces, from: "Frontiers in number theory, physics, and geometry, I" (editors P Cartier, B Julia, P Moussa, P Vanhove), Springer (2006) 437 | DOI

Cité par Sources :