Translation Actions on Non-Unimodular Groups and Strong Ergodicity
Abstract
We investigate translation actions of countable dense subgroups of non-unimodular locally compact second countable (lcsc) groups. Using left-right actions, we show that the left translation action G given by a countable dense subgroup of a locally compact second countable group G can only be strongly ergodic if G is almost unimodular. We show that the strong ergodicity of the action G for an almost unimodular lcsc group G is equivalent to the strong ergodicity of (G) (G), where G is the modular function. We demonstrate the absence of rigidity, by showing that non-isomorphic lcsc almost unimodular groups can admit orbit equivalent translation actions.
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