Alex Eskin scite author profile

Abstract. A holomorphic 1-form on a compact Riemann surface S naturally defines a flat metric on S with cone-type singularities. We present the following surprising phenomenon: having found a geodesic segment (saddle connection) joining a pair of conical points one can find with a nonzero probability another saddle connection on S having the same direction and the same length as the initial one. A similar phenomenon is valid for the families of parallel closed geodesics.We give a complete description of all possible configurations of parallel saddle connections (and of families of parallel closed geodesics) which might be found on a generic flat surface S. We count the number of saddle connections of length less than L on a generic flat surface S; we also count the number of admissible configurations of pairs (triples,...) of saddle connections; we count the analogous numbers of configurations of families of closed geodesics. By the previous result of [EMa] these numbers have quadratic asymptotics c · (πL 2 ). Here we explicitly compute the constant c for a configuration of every type. The constant c is found from a Siegel-Veech formula.To perform this computation we elaborate the detailed description of the principal part of the boundary of the moduli space of holomorphic 1-forms and we find the numerical value of the normalized volume of the tubular neighborhood of the boundary. We use this for evaluation of integrals over the moduli space.

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Mixing, counting, and equidistribution in Lie groups

Eskin¹,

McMullen²

1993

Duke Math. J.

275

271

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Upper Bounds and Asymptotics in a Quantitative Version of the Oppenheim Conjecture

Eskin¹,

Margulis²,

Mozes³

1998

The Annals of Mathematics

169

266

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Sum of Lyapunov exponents of the Hodge bundle with respect to the Teichmüller geodesic flow

2013

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1 2 ALEX ESKIN, MAXIM KONTSEVICH, AND ANTON ZORICH 4.1. Comparison of flat and hyperbolic geometry (after K. Rafi) 4.2. Flat pairs of pants 4.3. Geometric Compactification Theorem 4.4. The (δ, η)-thick-thin decomposition 4.5. Uniform bounds for the conformal factor 5. Analytic Riemann-Roch Theorem 5.1. Proof based on the results of J. Fay 5.2. Alternative proof based on results of A. Kokotov, D. Korotkin and P. Zograf 6. Relating flat and hyperbolic Laplacians by means of Polyakov formula 6.1. Polyakov formula revisited 6.2. Polyakov Formula applied to smoothed flat and hyperbolic metrics 6.3. Integration over a neighborhood of a cusp 7. Comparison of relative determinants of Laplace operators near the boundary of the moduli space 7.1. Admissible pairs of subsurfaces 7.2. Estimate for the thick part 7.3. Estimate for the thin part. 7.4. Proof of Theorem 11 8. Determinant of Laplacian near the boundary of the moduli space 8.1. Determinant of hyperbolic Laplacian near the boundary of the moduli space 8.2. Proof of Theorem 8 9. Cutoff near the boundary of the moduli space 9.1. Green's Formula and cutoff near the boundary 9.2. Restriction to cylinders of large modulus sharing parallel core curves 9.3. The Determinant of the Laplacian and the Siegel-Veech constant 10. Evaluation of Siegel-Veech constants 10.1. Arithmetic Teichmüller discs 10.2. Siegel-Veech constants for square-tiled surfaces Appendix A. Conjectural approximate values of individual Lyapunov exponents in small genera Appendix B. Square-tiled surfaces and permutations B.1. Alternative interpretation of Siegel-Veech constant for arithmetic Teichmüller discs B.2. Non varying phenomenon B.3. Global average Acknowledgments References

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Asymptotics of numbers of branched coverings of a torus and volumes of moduli spaces of holomorphic differentials

Eskin

Okounkov²

2001

Inventiones Mathematicae

154

216

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Alex Eskin

Moduli spaces of Abelian differentials: The principal boundary, counting problems, and the Siegel–Veech constants

Mixing, counting, and equidistribution in Lie groups

Upper Bounds and Asymptotics in a Quantitative Version of the Oppenheim Conjecture

Sum of Lyapunov exponents of the Hodge bundle with respect to the Teichmüller geodesic flow

Asymptotics of numbers of branched coverings of a torus and volumes of moduli spaces of holomorphic differentials

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