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An analogue of Bauer’s theorem for closed orbits of skew products

By William Parry and Mark Pollicott

Abstract

In this article we prove an analogue of Bauer’s theorem from algebraic number theory in the context of hyperbolic systems

Topics: QA
Publisher: Cambridge University Press
Year: 2008
OAI identifier: oai:wrap.warwick.ac.uk:660

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Citations

  1. (1992). A Chebotarev theorem for finite homogeneous extensions of shifts. doi
  2. (1988). A reciprocity law for prime geodesics. doi
  3. (1967). Algebraic Number Theory.
  4. (1982). Class numbers of indefinite binary quadratic forms. doi
  5. (2009). Elementary and Analytic Theory of Algebraic Numbers. doi
  6. (1992). Geometry and Spectra of Compact Riemann Surfaces (Progress doi
  7. (1970). Markov partitions for Axiom A diffeomorphisms. doi
  8. (1984). Natural coefficients and invariants for Markov-shifts. doi
  9. (1965). On periodic points. doi
  10. (1985). Riemannian coverings and isospectral manifolds. doi
  11. (1997). Skew products of shift with a compact Lie groups. doi
  12. (1973). Symbolic dynamics for hyperbolic flows. doi
  13. Tchbotarev’s density theorem for closed geodesics in a compact locally symmetric space of negative curvature.
  14. (1986). The Chebotarov theorem for Galois coverings of Axiom A flows. doi

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