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Symmetric Stable Processes on Amenable Groups
Published 9 May 2022 in math.PR, math.DS, and math.GR | (2205.04159v4)
Abstract: We show that if $G$ is a countable amenable group, then every stationary non-Gaussian symmetric $\alpha$-stable (S$\alpha$S) process indexed by $G$ is ergodic if and only if it is weakly-mixing, and it is ergodic if and only if its Rosinski minimal spectral representation is null. This extends the results for $\mathbb{Z}d$, and answers a question of P. Roy on discrete nilpotent groups to the extent of all countable amenable groups. As a result we construct on the Heisenberg group and on many Abelian groups, for all $\alpha$ in (0,2), stationary S$\alpha$S processes that are weakly-mixing but not strongly-mixing.
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