Abstract
We discuss various results about weighted dynamical zeta functions for real and complex hyperbolic dynamical systems, mainly their relationship with transfer operators.
This text was written at the Département de Mathématiques de l’Ecole Polytechnique Fédérale de Lausanne, Switzerland, whose hospitality and financial support are gratefully acknowledged.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
Similar content being viewed by others
References
Artin, M. and Mazur, B.: 1965, On periodic points’, Ann. of Math. (2) Vol. no. 21, pp. 82–99
Artuso, R., Aurell, E. and Cvitanovie, P.: 1990, Recycling of strange sets: I. Cycle expansions, II. Applications’, Nonlinearity Vol. no. 3, pp. 325–359 and 361–386
Baladi, V.: 1991, Comment compter avec les fonctions zêta?’, Gaz. Math. Vol. no. 47, pp. 79–96
Baladi, V. and Keller, G.: 1990, Zeta functions and transfer operators for piecewise monotone transformations’, Comm. Math. Phys Vol. no 127, pp. 459–477
Baladi, V. and Ruelle, D.: 1993, An extension of the theorem of Milnor and Thurston on zeta functions of interval maps’, IHES Preprint, to appear Ergodic Theory Dynamical Systems Bochner, S., and Martin W.T.: 1948, Several Complex Variables Princeton University Press, Princeton, NJ
Bowen, R.: 1975, Equilibrium States and the Ergodic Theory of Anosov Diffeomorphisms, Lecture Notes in Math. Vol. no. 470, Springer, Berlin
Bowen, R. and Lanford, O.E. III: 1970, Zeta functions of restrictions of the shift transformation’, Proc. Sympos. Pure Math. Vol. no. 14, pp. 43–50
Bowen, R. and Ruelle, D.: 1975, The ergodic theory of Axiom A flows’, Invent. Math. Vol. no. 29, pp. 181–202
Christiansen, F., Cvitanovié, P. and Rugh, H.H.: 1990, The spectrum of the period-doubling operator in terms of cycles’, J. Phys. A Vol. no. 23, pp. L713–L717
Devaney, R.: 1987 An Introduction to Chaotic Dynamical Systems, Addison-Wesley, Reading, MA Dunford, N. and Schwartz, J.T.: 1957 Linear Operators, Part I, Wiley-Interscience Publishers, New York
Fried, D.: 1986, The zeta functions of Ruelle and Selberg I’, Ann. Sci. École Norm. Sup. (4) Vol. no. 19, pp. 491–517
Gallavotti, G.: 1976, Funzioni zeta ed insiemi basilari’, Accad. Lincei Rend. Sc. fis., mat. e nat. Vol. no. 61, pp. 309–317
Ghys, E.: 1987, Flots d’Anosov dont les feuilletages stables sont différentiables’, Ann. Sci. École Norm. Sup. (4) Vol. no. 20, pp. 251–270
Grothendieck, A.: 1955, Produits tensoriels topologiques et espaces nucléaires’, Mem. Amer. Math. Soc. Vol. no. 16
Grothendieck, A.: 1956, La théorie de Fredholm’, Bull. Soc. Math. France Vol. no. 84, pp. 319–384 Haydn, N.T.A.: 1990a, Gibbs functionals on subshifts’, Comm. Math. Phys. Vol. no. 134, pp. 217–236
Haydn, N.T.A.: 1990b, Meromorphic extension of the zeta function for Axiom A flows’, Ergodic Theory Dynamical Systems Vol. no. 10, pp. 347–360
Hejhal, D.A.: 1976, The Selberg Trace Formula for PSL(2, R), Vol. 1., Lecture Notes in Math. Vol. no. 548, Springer, Berlin
Hofbauer, F.: 1986, Piecewise invertible dynamical systems’, Probab. Theory Related Fields. Vol. no. 72, pp. 359–386
Hofbauer, F. and Keller, G.: 1982, Ergodic properties of invariant measures for piecewise monotonic transformations’, Math. Z. Vol. no. 180, pp. 119–140
Hofbauer, F. and Keller, G.: 1984, Zeta-functions and transfer-operators for piecewise linear transformations’, J. Reine Angew. Math. Vol. no. 352, pp. 100–113
Hurt, N.E.: 1993, Zeta functions and periodic orbit theory: a review’, Resultate Math. Vol. no. 23, pp. 55–120
Isola, S.: 1990, c-functions and distribution of periodic orbits of toral automorphisme’, Europhysics Letters Vol. no. 11, pp. 517–522
Jiang, Y., Morita T., and Sullivan D.: 1992, Expanding direction of the period doubling operator’, Comm. Math. Phys. Vol. no. 144, pp. 509–520
Keller, G.: 1989, Markov extensions, zeta-functions, and Fredholm theory for piecewise invertible dynamical systems’, Trans. Amer. Math. Soc. Vol. no. 314, pp. 433–499
Keller, G. and Nowicki, T.: 1992, Spectral theory, zeta functions and the distribution of periodic points for Collet-Eckmann maps’, Comm. Math. Phys. Vol. no. 149, pp. 31–69
Levin, G.: 1992, On Mayer’s conjecture and zeros of entire functions’, preprint
Levin, G., Sodin, M. and Yuditskii, P.: 1991, A Ruelle operator for a real Julia set’, Comm. Math. Phys. Vol. no. 141, pp. 119–131
Levin, G., Sodin, M. and Yuditskii, P.: 1992 Ruelle operators with rational weights for Julia sets’, preprint, to appear J. Analyse Math.
Manning, A.: 1971, Axiom A diffeomorphisms have rational zeta functions’, Bull. London Math. Soc. Vol. no. 3, pp. 215–220
Mayer, D.: 1976, On a (-function related to the continued fraction transformation’, Bull. Soc. Math. France Vol. no. 104, pp. 195–203
Mayer, D.: 1980, The Ruelle-Araki Transfer Operator in Classical Statistical Mechanics Lecture Notes in Physics Vol. no. 123, Springer, Berlin
Mayer, D.: 1990, On the thermodynamic formalism for the Gauss map’, Comm. Math. Phys. Vol. no. 130, pp. 311–333
Mayer, D.: 1991, Continued fractions and related transformations’ in Ergodic Theory, Symbolic Dynamics and Hyperbolic Spaces T. Bedford, M. Keane, C. Series, eds., Oxford University Press, Oxford
Milnor, J. and Thurston, W.: 1988, On iterated maps of the interval’, in Dynamical Systems (Lecture Notes in Math. Vol. no. 1342) pp. 465–564, Springer, Berlin
Mori, M.: 1990, Fredholm determinant for piecewise linear transformations’, Osaka J. Math Vol. no. 27, pp. 81–116
Mori, M.: 1991, Fredholm matrices and zeta functions for piecewise monotonic transformations’, in: Dynamical Systems and Related Topics (Nagoya 1990) Adv. Ser. Dyn. Syst., 9, World Sci. Publishing, River Edge, NJ pp. 388–400
Parry, W.: 1984, ‘Bowen’s equidistribution theory and the Dirichlet density theorem’, Ergodic Theory Dynamical Systems Vol. no. 4, pp. 117–134
Parry, W.: 1988, Equilibrium states and weighted uniform distributions of closed orbits’, in Dynamical Systems (Lecture Notes in Math. Vol. no. 1342) pp. 617–625, Springer, Berlin
Parry, W. and Pollicott, M.: 1983, An analogue of the prime number theorem for closed orbits of Axiom A flows’, Ann. of Math (2) Vol. no. 118, pp. 573–591
Parry, W. and Pollicott, M.: 1990, Zeta Functions and the Periodic Structure of Hyperbolic Dynamics,Société Mathématique de France (Astérisque Vol. no. 187–188),Paris
Pollicott, M.: 1984, A complex Ruelle-Perron-Frobenius theorem and two counterexamples’, Ergodic Theory Dynamical Systems Vol. no. 4, pp. 135–146
Pollicott, M.: 1985, On the rate of mixing of Axiom A flows’, Invent. Math. Vol. no. 81, pp. 413–426
Pollicott, M.: 1986, Meromorphic extensions of generalised zeta functions’, Invent. Math. Vol. no. 85, pp. 147–164
Pollicott, M.: 1991a, A note on the Artuso-Aurell-Cvitanovic approach to the Feigenbaum tangent operator’, J. Statist. Phys. Vol. no. 62, pp. 257–267
Pollicott, M.: 1991b, Some applications of thermodynamic formalism to manifolds of constant negative curvature’, Adv. in Math. Vol. no. 85, pp. 161–192
Prellberg, T.: 1991, Maps of the interval with indifferent fixed points: thermodynamic formalism and phase transitions’, (Ph. D. thesis Virginia Polytechnic Institute and State University) Ratner, M.: 1987, The rate of mixing for geodesic and horocycle flows’, Ergodic Theory Dynamical Systems, Vol. no. 7, pp. 267–288
Riesz F., and Sz-Nagy B.: 1955, Leçons d’Analyse Fonctionnelle,3ème édition, Académie des Sciences de Hongrie
Ruelle, D.: 1976, Zeta functions for expanding maps and Anosov flows’, Invent. Math., Vol. no. 34, pp. 231–242
Ruelle, D.: 1978, Thermodynamic Formalism, Addison-Wesley, Reading MA
Ruelle, D.: 1983, Flots qui ne mélangent pas exponentiellement’, C. R. Acad. Sci. Paris Sér. I Math, Vol. no. 296, pp. 191–193
Ruelle, D.: 1987a, Resonances for Axiom A flows’, J. Differential Geom. Vol. no. 25, pp. 99–116 Ruelle, D.: 1987b, One-dimensional Gibbs states and Axiom A diffeomorphisms’, J. Differential Geom. Vol. no. 25, pp. 117–137
Ruelle, D.: 1989, The thermodynamic formalism for expanding maps’, Comm. Math. Phys. Vol. no. 125, pp. 239–262
Ruelle, D.: 1990, An extension of the theory of Fredholm determinants’, Inst. Hautes Etudes Sci. Publ. Math. Vol. no. 72, pp. 175–193
Ruelle, D.: 1992, ‘Spectral properties of a class of operators associated with conformal maps in two dimensions’, Comm. Math. Phys. Vol. no. 144, pp. 537–556
Ruelle, D.: 1993, ‘Analytic completion for dynamical zeta functions’, Hely. Phys. Acta Vol. no. 66, pp. 181–191
Ruelle, D.: 1994, Dynamical zeta functions for piecewise monotone maps of the interval’, CRM Monograph Series, Amer. Math. Soc., Amer. Math. Soc., Providence, RI
Rugh, H.H.: 1992, The correlation spectrum for hyperbolic analytic maps’, Nonlinearity Vol. no. 5, pp. 1237–1263
Sinai, S.: 1972, Gibbs measures in ergodic theory’, Russian Math. Surveys Vol. no. 27, pp. 21–70
Smale, S.: 1967, Differentiable dynamical systems’, Bull. Amer. Math. Soc. Vol. no. 73, pp. 747817
Tangerman, F.: 1986, Meromorphic continuation of Ruelle zeta function’, Ph.D. Thesis, Boston University, unpublished
Vul, E., Khanin, K., and Sinai, Y.: 1984, Feigenbaum universality and the thermodynamic formalism’, Russian Math. Surveys Vol. no. 39, pp. 1–40
Walters, P.: 1982, An Introduction to Ergodic Theory, Springer, Graduate Texts in Math. Vol. no. 79, New York
Young, L.-S.: 1992, ‘Decay of correlations for certain quadratic maps’, Comm. Math. Phys. Vol. no. 146, pp. 123–138
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 1995 Springer Science+Business Media Dordrecht
About this chapter
Cite this chapter
Baladi, V. (1995). Dynamical Zeta Functions. In: Branner, B., Hjorth, P. (eds) Real and Complex Dynamical Systems. NATO ASI Series, vol 464. Springer, Dordrecht. https://doi.org/10.1007/978-94-015-8439-5_1
Download citation
DOI: https://doi.org/10.1007/978-94-015-8439-5_1
Publisher Name: Springer, Dordrecht
Print ISBN: 978-90-481-4565-2
Online ISBN: 978-94-015-8439-5
eBook Packages: Springer Book Archive