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Rohlin properties for ℤ
d
actions on the cantor set
Michael Hochman
*
*
Corresponding author for this work
Einstein Institute of Mathematics
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peer-review
2
Scopus citations
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d
actions on the cantor set'. Together they form a unique fingerprint.
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Keyphrases
Cantor Set
100%
Rohlin Property
100%
Conjugacy Classes
100%
Effective Action
75%
Minimal Action
50%
Transitive Actions
25%
Homeomorphism
25%
Nowhere Dense
25%
Shift of Finite Type
25%
Isomorphism Class
25%
Transitive Points
25%
Topologically Transitive
25%
Mathematics
Cantor Set
100%
Conjugacy Class
100%
Homeomorphism
25%
Shift Of Finite Type
25%
Residuals
25%
Isomorphism Class
25%
Computer Science
Related Question
100%