Distal actions and ergodic actions on compact groups
Abstract
Let K be a compact metrizable group and be a group of automorphisms of K. We first show that each ∈ is distal on K implies itself is distal on K, a local to global correspondence provided is a generalized FC-group or K is a connected finite-dimensional group. We show that contains an ergodic automorphism when is nilpotent and ergodic on a connected finite-dimensional compact abelian group K.
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