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ZERO-ONE LAW OF HAUSDORFF DIMENSIONS OF THE RECURRENT SETSopen access
- Authors
- Kim, Dong Han; Li, Bing
- Issue Date
- Oct-2016
- Publisher
- AMER INST MATHEMATICAL SCIENCES-AIMS
- Keywords
- First return time; Hausdorff dimension; recurrence; zero-one law; symbolic dynamics
- Citation
- DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS, v.36, no.10, pp 5477 - 5492
- Pages
- 16
- Indexed
- SCI
SCIE
SCOPUS
- Journal Title
- DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
- Volume
- 36
- Number
- 10
- Start Page
- 5477
- End Page
- 5492
- ISSN
- 1078-0947
1553-5231
- Abstract
- Let (Sigma, sigma) be the one-sided shift space with m symbols and R-n(x) be the first return time of x is an element of Sigma to the n-th cylinder containing x. Denote E-alpha, beta(phi) - {x is an element of Sigma : lim(n ->infinity) inf log R-n(x)/phi(n) - alpha, lim(n ->infinity) sup log R-n(x)/phi(n) - beta}, where phi : N -> R+ is a monotonically increasing function and 0 <= alpha <= beta <=+infinity. We show that the Hausdorff dimension of the set E-alpha, beta(phi) admits a dichotomy: it is either zero or one depending on phi, alpha and beta.
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Related Researcher
- Kim, Dong Han
- College of Education (Department of Mathematics Education)