Mathematics – Dynamical Systems
Scientific paper
2011-02-05
Mathematics
Dynamical Systems
23 pages
Scientific paper
We study the set $M_\infty(X)$ of all infinite full non-atomic Borel measures on a Cantor space X. For a measure $\mu$ from $M_\infty(X)$ we define a defective set $M_\mu = \{x \in X : for any clopen set U which contains x we have \mu(U) = \infty \}$. We call a measure $\mu$ from $M_\infty(X)$ non-defective ($\mu \in M_\infty^0(X)$) if $\mu(M_\mu) = 0$. The paper is devoted to the classification of measures $\mu$ from $M_\infty^0(X)$ with respect to a homeomorphism. The notions of goodness and clopen values set $S(\mu)$ are defined for a non-defective measure $\mu$. We give a criterion when two good non-defective measures are homeomorphic and prove that there exist continuum classes of weakly homeomorphic good non-defective measures on a Cantor space. For any group-like subset $D \subset [0,\infty)$ we find a good non-defective measure $\mu$ on a Cantor space X with $S(\mu) = D$ and an aperiodic homeomorphism of X which preserves $\mu$. The set $S$ of infinite ergodic R-invariant measures on non-simple stationary Bratteli diagrams consists of non-defective measures. For $\mu \in S$ the set $S(\mu)$ is group-like, a criterion of goodness is proved for such measures. We show that a homeomorphism class of a good measure from $S$ contains countably many distinct good measures from $S$.
No associations
LandOfFree
Infinite measures on Cantor spaces does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.
If you have personal experience with Infinite measures on Cantor spaces, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Infinite measures on Cantor spaces will most certainly appreciate the feedback.
Profile ID: LFWR-SCP-O-52723