Let $K$ be a compact metrizable group and $\Ga$ be a group of automorphisms of $K$. We first show that each $\ap \in \Ga$ is distal on $K$ implies $\Ga$ itself is distal on $K$, a local to global correspondence provided $\Ga$ is a generalized $\ov{FC}$-group or $K$ is a connected finite-dimensional group. We show that $\Ga$ contains an ergodic automorphism when $\Ga$ is nilpotent and ergodic on a connected finite-dimensional compact abelian group $K$.
On the existence of ergodic automorphisms in ergodic ${\mathbb Z} ^d$-actions on compact groups
Some Properties of Distal Actions on Locally Compact Groups
New spectral multiplicities for ergodic actions
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