Author:
DOOLEY ANTHONY H.,HAGIHARA RIKA
Abstract
AbstractThe critical dimension is an invariant that measures the growth rate of the sums of Radon–Nikodym derivatives for non-singular dynamical systems. We show that for Bratteli–Vershik systems with multiple edges, the critical dimension can be computed by a formula analogous to the Shannon–McMillan–Breiman theorem. This extends earlier results of Dooley and Mortiss on computing the critical dimensions for product and Markov odometers on infinite product spaces.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
Reference15 articles.
1. A LIMIT PROPERTY OF ARBITRARY DISCRETE INFORMATION SOURCES
2. An invariant for non-singular isomorphism
3. [10] Mortiss G. . Average co-ordinate entropy and a non-singular version of restricted orbit equivalence. PhD Thesis, University of New South Wales, 1997.
4. Invariant measures and Radon-Nikodym derivatives
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