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Dynamical Systems and Related Topics Workshop
March 21-24, 1998
University of Maryland
College Park, MD, USA |
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Organizers
Mike Boyle, Brian Hunt, Jim Yorke
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Dynamical system on Cantor set
by
Makoto Mori
Dept.Math. College of Humanities and Sciences, Nihon university
Dynamical system on Cantor set
Dynamical system on Cantor set
Makoto Mori
Feb. 22
One of the way to study the ergodic properties of a dynamical system
generated by an expanding map from an interval into itself is to study
the spectra of the corresponding Perron-Frobenius operator. We consider
generating functions associated with the dynamical system. Then constructing
a renewal equation, we define a `Fredholm Matrix' \Phi(z). We prove that
the determinant det(I-\Phi(z)) plays a similar role as the Fredholm
determinant in case of nuclear operators. Moreover, using the fact that
the Fredholm Matrix \Phi(z) is essentially the structure matrix,
we can show the Ruelle's zeta function satisfies
\zeta(z)=(det(I-\Phi(z))-1. Combining the above results, we also get
the relations between the singularities of the zeta function and the spectra
of the Perron-Frobenius operator.
Applying the above results to cantor set generated by an expanding map,
we can determine not only the Hausdorff dimension of the cantor set
but also the density function of the invariant measure absolutely continuous
to the Hausdorff measure and study the ergodic properties of the dynamical
system.
Date received: February 23, 1998
Copyright © 1998 by the author(s).
The author(s) of this document and the organizers of the conference
have granted their consent to include this abstract in
Atlas Conferences Inc.
Document # cabf-08.