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2017 | OriginalPaper | Buchkapitel

1. Introduction

verfasst von : Markus Szymon Fraczek

Erschienen in: Selberg Zeta Functions and Transfer Operators

Verlag: Springer International Publishing

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Abstract

In recent years the application of the transfer operator method in the study of Selberg zeta functions and the spectral theory of hyperbolic spaces has made significant progress, in both analytical investigations and numerical investigations. We consider transfer operators for the geodesic flow on surfaces of constant negative curvature, therefore systems where a particle is moving freely on such a surface with constant velocity.

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Nächstes Kapitel Preliminaries

Adler, R., Flatto, L.: Cross section map for the geodesic flow on the modular surface. Contemp. Math. 26, 9–24 (1984)MathSciNetCrossRefMATH

Artin, E.: Ein mechanisches System mit quasi-ergodischen Bahnen. Abh. Math. Sem. d. Hamburgischen Universität 3, 170–175 (1924) (Also in Collected Papers, Addison-Wesley, pp. 499–501 (1965))

Atkin, A.O.L., Lehner, J.: Hecke operators on Γ ₀(m). Math. Ann. 185 (2), 134–160 (1970)MathSciNetCrossRefMATH

Avelin, H.: Deformation of Γ ₀(5)-cusp forms. Math. Comput. 76, 361–384 (2007)MathSciNetCrossRefMATH

Avelin, H.: Computations of Eisenstein series on Fuchsian groups. Math. Comput. 77, 1779–1800 (2008)MathSciNetCrossRefMATH

Baladi, V.: Positive Transfer Operators and Decay of Correlations. World Scientific, Singapore (2000)CrossRefMATH

10.

Banach, S.: Théorie des opérations linéaires. Ed. S. Banach, B. Knaster, K. Kuratowski, S. Mazurkiewicz, W. Sierpiński i H. Steinhaus, Monografie Matematyczne, vol. 1. Instytut Matematyczny Polskiej Akademi Nauk (1932)

13.

Booker, A., Strömbergsson, A., Venkatesh, A.: Effective computation of Maass cusp forms. IMRN 2006, 1–34 (2006)MATH

15.

Borthwick, D.: Distribution of resonances for hyperbolic surfaces. Exp. Math. 23 (1), 25–45 (2014)MathSciNetCrossRefMATH

16.

Bowen, R.: Symbolic dynamics for hyperbolic flows. Am. J. Math. 95 (2), 429–460 (1973)MathSciNetCrossRefMATH

17.

Bowen, R., Chazottes, J. (eds.) Equilibrium States and the Ergodic Theory of Anosov Diffeomorphisms, 2nd edn. Springer, Berlin/Heidelberg (2008)MATH

18.

Bowen, R., Ruelle, D.: The Ergodic theory of Axiom A flows. Invent. Math. 29, 181–202 (1975)MathSciNetCrossRefMATH

19.

Bowen, R., Series, C.: Markov maps associated with Fuchsian groups. Publications Mathématiques de L’IHÉS 50 (1), 153–170 (1979)MathSciNetCrossRefMATH

22.

Bruggeman, R., Fraczek, M., Mayer, D.: Perturbation of zeros of the Selberg zeta-function for Γ ₀(4). Exp. Math. 22 (3), 217–252 (2013)MathSciNetCrossRefMATH

23.

Bruggeman, R., Lewis, J., Zagier, D.: Function theory related to the group \(\mathrm{PSL}\!\left (2, \mathbb{R}\right )\). Dev. Math. 28, 107–201 (2013)MathSciNetMATH

24.

Bruggeman, R., Lewis, J., Zagier, D.: Period Functions for Maass Forms and Cohomology. Memoirs of the American Mathematical Society. American Mathematical Society, Providence (2015)MATH

29.

Chang, C.H., Mayer, D.: The transfer operator approach to Selberg’s zeta function and modular and Maass wave forms for \(\mathrm{PSL}\!\left (2, \mathbb{Z}\right )\). In: Hejhal, D., Gutzwiller, M., et al. (eds.) Emerging Applications of Number Theory, pp. 72–142. Springer, New York (1999)

30.

Chang, C.H., Mayer, D.: An extension of the thermodynamic formalism approach to Selberg’s zeta function for general modular groups. In: Fiedler, B. (eds.) Ergodic Theory, Analysis, and Efficient Simulation of Dynamical Systems, pp. 523–562. Springer, Berlin/New York (2001)CrossRef

31.

Cornfeld, I., Fomin, S., Sinai, Y.: Ergodic Theory. Grundlehren der mathematischen Wissenschaften, vol. 245. Springer, New York (1982)

33.

Deshouillers, J., Iwaniec, H., Phillips, R., Sarnak, P.: Maass cusp forms. Proc. Natl. Acad. Sci. USA 82, 3533–3534 (1985)MathSciNetCrossRefMATH

34.

Devaney, R.: An Introduction to Chaotic Dynamical Systems, 2nd edn. Westview Press, Cambridge/Boulder (2003)MATH

35.

Diu, B., Guthmann, C., Lederer, D., Roulet, B.: Grundlagen der Statistischen Physik. de Gruyter (1994)

37.

Eckmann, J., Ruelle, D.: Ergodic theory of chaos and strange attractors. Rev. Mod. Phys. 57, 617–656 (1985)MathSciNetCrossRefMATH

38.

Efrat, I.: Dynamics of the continued fraction map and the spectral theory of \(\mathrm{SL}\!\left (2, \mathbb{Z}\right )\). Invent. math. 114, 207–218 (1993)MathSciNetCrossRefMATH

40.

Farmer, D., Lemurell, S.: Deformations of Maass forms. Math. Comput. 74 (252), 1967–1982 (2005)MathSciNetCrossRefMATH

42.

Fraczek, M.: Spezielle Eigenfunktionen des Transfer-Operators für Hecke Kongruenz Untergruppen. Diploma Thesis, Clausthal University (2006)

44.

Fraczek, M., Mayer, D.: Symmetries of the transfer operator for Γ ₀(n) and a character deformation of the Selberg zeta function for Γ ₀(4). Algebra Number Theory 6 (3), 587–610 (2012)MathSciNetCrossRefMATH

45.

Fraczek, M., Mayer, D., Mühlenbruch, T.: A realization of the Hecke algebra on the space of period functions for Γ ₀(n). J. reine angew. Math. 603, 133–163 (2007)MathSciNetMATH

48.

Fried, D.: The zeta functions of Ruelle and Selberg. Ann. Sci. Ec. Norm. Sup. 19, 491–517 (1986)MathSciNetCrossRefMATH

49.

Fried, D.: Symbolic dynamics for triangle groups. Invent. Math. 125, 487–521 (1996)MathSciNetCrossRefMATH

52.

Gottlieb, D., Shu, C.: On the Gibbs phenomenon and its resolution. SIAM Rev. 39 (4), 644–668 (1997)MathSciNetCrossRefMATH

56.

Guillope, L., Lin, K., Zworski, M.: The Selberg zeta function for convex co-compact Schottky groups. Commun. Math. Phys. 245 (1), 149–175 (2004)MathSciNetCrossRefMATH

57.

Hadamard, J.: Les surfaces à courbures opposées et leurs lignes géodésique. J. Math. Pures Appl. 4, 27–73 (1898)MATH

60.

Hejhal, D.: Eigenvalues of the Laplacian for Hecke triangle groups. Mem. Am. Math. Soc. 97 (496) (1992). http://www.ams.org/books/memo/0469/

61.

Hejhal, D.: On the calculation of Maass cusp forms. In: Bolte, J., Steiner, F. (eds.) Hyperbolic Geometry and Applications in Quantum Chaos and Cosmology, pp. 175–186. Cambridge University Press, Cambridge, UK (2011)CrossRef

63.

Hilgert, J., Mayer, D., Movasati, H.: Transfer operators for Γ ₀(n) and the Hecke operators for period functions of \(\mathrm{PSL}\!\left (2, \mathbb{Z}\right )\). Math. Proc. Camb. Philos. Soc. 139, 81–116 (2005)MathSciNetCrossRefMATH

64.

Hove, L.V.: Sur L’intégrale de Configuration Pour Les Systèmes De Particules À Une Dimension. Physica 16 (2), 137–143 (1950)MathSciNetCrossRefMATH

67.

Ising, E.: Beitrag zur Theorie des Ferromagnetismus. Zeitschrift für Physik A Hadrons and Nuclei 31 (1), 253–258 (1925)

68.

Iwaniec, H.: Spectral Methods of Automorphic Forms. American Mathematical Society, Providence (2002)CrossRefMATH

69.

Judge, C.: On the existence of maass cusp forms on hyperbolic surfaces with cone points. J. Am. Math. Soc. 8 (3), 715–759 (1995)MathSciNetCrossRefMATH

70.

Kac, M.: On the partition function of a one-dimensinal lattice gas. Phys. Fluids 2, 8–12 (1959)CrossRefMATH

75.

Lasota, A., Mackey, M.: Chaos, Fractals, and Noise: Stochastic Aspects of Dynamics. Springer, New York (1994)CrossRefMATH

76.

Lenz, W.: Beitrag zum Verständnis der magnetischen Eigenschaften in festen Körpern. Physikalische Zeitschrift 21, 613–615 (1920)

78.

Lewis, J., Zagier, D.: Period functions for Maass wave forms, I. Ann. Math. 153, 191–258 (2001)MathSciNetCrossRefMATH

80.

Lieb, E., Mattis, D.: Mathematical Physics in One Dimension: Exactly Soluble Models of Interacting Particles. Perspectives in Physics: A Series of Reprint Collections. Academic Press, New York (1966)

81.

Manin, Y., Marcolli, M.: Continued fractions, modular symbols and non commutative geometry. Selecta Math. (N.S.) 8, 475–520 (2002)

82.

Margulis, G.: On Some Aspects of the Theory of Anosov Systems. With a Survey by Richard Sharp: Periodic Orbits of Hyperbolic Flows. Springer Monographs in Mathematics. Springer, Berlin/Heidelberg (2004)

84.

Matthies, C., Steiner, F.: Selberg’s ζ function and the quantization of chaos. Phys. Rev. A 44 (12), R7877–R7880 (1991)MathSciNetCrossRef

87.

Mayer, D.: The Ruelle-Araki Transfer Operator in Classical Statistical Mechanics. Lecture Notes in Physics, vol. 123. Springer, Berlin/Heidelberg (1980)

88.

Mayer, D.: On the thermodynamic formalism for the Gauss map. Commun. Math. Phys. 130 (2), 311–333 (1990)MathSciNetCrossRefMATH

89.

Mayer, D.: Continued fractions and related transformations, chap. 7 In: Bedford, T., et al. (eds.) Ergodic Theory, Symbolic Dynamics and Hyperbolic Spaces, pp. 175–222. Oxford University Press, Oxford/New York (1991)

90.

Mayer, D.: The thermodynamic formalism approach to Selberg’s zeta function for \(\mathrm{PSL}\!\left (2, \mathbb{Z}\right )\). Bull. Am. Math. Soc. (N.S.) 25 (1), 55–60 (1991)

91.

Mayer, D.: Transfer operators, the Selberg zeta function and the Lewis-Zagier theory of period functions. In: Bolte, J., Steiner, F. (eds.) Hyperbolic Geometry and Applications in Quantum Chaos and Cosmology, pp. 143–174. Cambridge University Press, Cambridge, UK (2011)CrossRef

92.

Mayer, D., Mühlenbruch, T., Strömberg, F.: The transfer operator for Heck triangle groups. In: Discrete and Continuous Dynamical Systems - Series A, vol. 32, number 7, pp. 2453–2484 (2012)

94.

Mayer, D., Strömberg, F.: Symbolic dynamics for the geodesic flow on Hecke surfaces. J. Mod. Dyn. 2 (4), 581–627 (2008)MathSciNetCrossRefMATH

96.

Möller, M., Pohl, A.: Period functions for Hecke triangle groups, and the Selberg zeta function as a Fredholm determinant. Ergod. Theory Dyn. Syst. 33 (1), 247–283 (2013)MathSciNetCrossRefMATH

97.

Morita, T.: Markov systems and transfer operators associated with cofinite Fuchsian groups. Ergod. Theory Dyn. Syst. 17 (5), 1147–1181 (1997)MathSciNetCrossRefMATH

99.

Mühlenbruch, T.: Hecke operators on period functions for Γ ₀(n). J. Number Theory 118, 208–235 (2006)MathSciNetCrossRefMATH

100.

Onsager, L.: Crystal statistics. I. A two-dimensional model with an order-disorder transition. Phys. Rev. 65, 117–149 (1944)MathSciNetMATH

101.

Petridis, Y., Risager, M.: Dissolving cusp forms: higher order Fermi’s golden rules. Mathematika 59, 269–301 (2013)MathSciNetCrossRefMATH

102.

Phillips, R., Sarnak, P.: On cusp forms for co-finite subgroups of \(\mathrm{PSL}\!\left (2, \mathbb{Z}\right )\). Invent. Math. 80, 339–364 (1985)MathSciNetCrossRefMATH

103.

Phillips, R., Sarnak, P.: The spectrum of fermat curves. Geom. Funct. Anal. 1, 80–146 (1991)MathSciNetCrossRefMATH

104.

Phillips, R., Sarnak, P.: Cusp forms for character varieties. Geom. Funct. Anal. 4, 93–118 (1994)MathSciNetCrossRefMATH

107.

Pollicott, M.: Some applications of thermodynamic formalism to manifolds with constant negative curvature. Adv. Math. 85 (2), 161–192 (1991)MathSciNetCrossRefMATH

109.

Ratner, M.: Markov partitions for Anosov flows on 3-dimensional manifolds. Mat. Zam. 6, 693–704 (1969)

110.

Ratner, M.: Markov partitions for Anosov flows on n-dimensional manifolds. Israel J. Math. 6, 92–114 (1973)MathSciNetCrossRefMATH

111.

Ruelle, D.: Generalized zeta-functions for Axiom A basic sets. Bull. Am. Math. Soc. 82 (1), 153–156 (1976)MathSciNetCrossRefMATH

113.

Ruelle, D.: Zeta-functions for expanding maps and Anosov flows. Inventiones Mathematicae 34 (3), 231–242 (1976)MathSciNetCrossRefMATH

114.

Ruelle, D.: Thermodynamic Formalism: The Mathematical Structures of Equilibrium Statistical Mechanics, 2nd edn. Cambridge University Press, Cambridge/New York (2004)CrossRefMATH

117.

Selberg, A.: Harmonic analysis and discontinuous groups in weakly symmetric Riemannian spaces with applications to Dirichlet series. J. Indian Math. Soc. 20, 47–87 (1956)MathSciNetMATH

118.

Selberg, A.: Atle Selberg Collected Papers, vol. 1, chap. Harmonic Analysis (Göttingen lectures), 1954, pp. 626–674. Springer, Springer, Berlin/Heidelberg (1989)

119.

Selberg, A.: Remarks on the distribution of poles of Eisenstein series. In: Festschrift in Honor of I.I. Piatetski-Shapiro, vol. 2, pp. 251–278 (1990) (Also in Collected Papers, vol. 2, pp. 15–45. Springer, Springer, Berlin/Heidelberg (1991))

120.

Series, C.: The modular surface and continued fractions. J. Lond. Math. Soc. (2) 31, 69–80 (1985)

121.

Sinai, Y.: Classical dynamical systems with countably-multiple Lebesque spectrum. Izv. Akad. Nauk SSSR Ser. Mat. 30, 15–68 (1966)MathSciNet

122.

Sinai, Y.: Introduction to Ergodic Theory. Princeton University Press, Princeton (1977)

123.

Smale, S.: Differentiable dynamical systems. Bull. Am. Math. Soc. 73 (6), 747–817 (1967)MathSciNetCrossRefMATH

126.

Strömberg, F.: Computation of Selberg Zeta Functions on Hecke Triangle Groups. arXiv:0804.4837v1 (2008, preprint)

127.

Strömberg, F.: Maass Waveforms on (Γ ₀(N), χ) (Computational Aspects). In: Bolte, J., Steiner, F. (eds.) Hyperbolic Geometry and Applications in Quantum Chaos and Cosmology, pp. 187–228. Cambridge University Press, Cambridge, UK (2011)CrossRef

129.

Then, H.: Maass cusp forms for large eigenvalues. Math. Comput. 74 (249), 363–381 (2005)MathSciNetCrossRefMATH

133.

Winkler, A.: Cusp forms and Hecke groups. Journal für die reine und angewandte Mathematik (Crelles Journal) (386), 187–204 (1988)

134.

Wolpert, S.: Disappearance of cusp forms in special families. Ann. Math. 139 (2), 239–291 (1994)MathSciNetCrossRefMATH

Titel: Introduction
verfasst von: Markus Szymon Fraczek
Verlag: Springer International Publishing
Buch: Selberg Zeta Functions and Transfer Operators
Print ISBN: 978-3-319-51294-5

Electronic ISBN: 978-3-319-51296-9

Copyright-Jahr: 2017
DOI: https://doi.org/10.1007/978-3-319-51296-9_1

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