Artin-Mazur zeta function

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In mathematics, the Artin-Mazur zeta-function is a tool for studying the iterated functions that occur in dynamical systems and fractals.

It is defined as the formal power series

$\zeta_f(z)=\exp \sum_{n=1}^\infty \textrm{card} \left(\textrm{Fix} (f^n)\right) \frac {z^n}{n},$

where Fix(ƒⁿ) is the set of fixed points of the nth iterate of an iterated function ƒ, and card(Fix(ƒⁿ)) is the cardinality of this set of fixed points.

Note that the zeta-function is defined only if the set of fixed points is finite. This definition is formal in that it does not always have a positive radius of convergence.

The Artin-Mazur zeta-function is invariant under topological conjugation.

The Milnor-Thurston theorem states that the Artin-Mazur zeta-function is the inverse of the kneading determinant of ƒ.

[edit] Analogues

The Artin-Mazur zeta-function is formally similar to the local zeta function, when a diffeomorphism on a compact manifold replaces the Frobenius mapping for an algebraic variety over a finite field.

Under certain cases, the Artin-Mazur zeta-function can be related to the Ihara zeta-function of a graph.

[edit] See also

[edit] References

M. Artin and Barry Mazur, On periodic points, Ann. of Math (2) 81 (1965) 82–99.
David Ruelle, Dynamical Zeta Functions and Transfer Operators (2002) (PDF)

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