Groups of Transformations without Finite Invariant Measures Have Strong Generators of Size 2
Kuntz, Amy J.
Ann. Probab., Tome 2 (1974) no. 6, p. 143-146 / Harvested from Project Euclid
A size 2 generator of a measure space $(\mathbf{X}, \mathscr{F}, p)$ under a set of $\mathbf{S}$ of transformation of $X$ is a partition $\{A, A^c\}$ of $X$ such that $\mathscr{F}$ is the smallest $\sigma$-algebra containing $\{s^{-1}A: s\in S\}$ up to sets of $p$-measure zero. Let $S$ be a semigroup of invertible nonsingular measurable transformations on a separable measure space $(X, \mathscr{F}, p)$ with $p(X) = 1$. Suppose that $S$ does not preserve any finite invariant measure absolutely continuous with respect to $p$. Then $\mathscr{F}$ has a size 2 generator $\{A, A^c\}$ and the orbit of $A$ under $S$ is dense in $\mathscr{F}$.
Publié le : 1974-02-14
Classification:  Size-2 generator,  weakly wandering sets,  no finite invariant measure,  28A65,  20M20
@article{1176996759,
     author = {Kuntz, Amy J.},
     title = {Groups of Transformations without Finite Invariant Measures Have Strong Generators of Size 2},
     journal = {Ann. Probab.},
     volume = {2},
     number = {6},
     year = {1974},
     pages = { 143-146},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1176996759}
}
Kuntz, Amy J. Groups of Transformations without Finite Invariant Measures Have Strong Generators of Size 2. Ann. Probab., Tome 2 (1974) no. 6, pp.  143-146. http://gdmltest.u-ga.fr/item/1176996759/