An increasing sequence of integers, $\ewwB$, is given for which there exists a family of ergodic, infinite measure preserving transformations $T_\alpha$, $0 \leq \alpha \leq 1$ so that (1) $T_\alpha$ is of $\alpha$-type and (2) $\ewwB$ is an exhaustive weakly wandering sequence for each $T_\alpha$.
Jan 25, 2021
Feb 12, 2020
|Exhaustive Weakly Wandering Sequences and Alpha-type Transformations||Jan 25, 2021|
Victor Arzumanian Stanley Eigen Arshag Hajian
Victor Arzumanian Rafayel Barkhudaryan Stanley Eigen Anry Nersessian