Krieger's type for ergodic nonsingular Poisson actions of non-(T) locally compact groups
Abstract
It is shown that each non-compact locally compact second countable non-(T) group G possesses non-strongly ergodic weakly mixing IDPFT Poisson actions of arbitrary Krieger's type. These actions are amenable if and only if G is amenable. If G has the Haagerup property then (and only then) these actions can be chosen of 0-type. If G is amenable and unimodular then G has weakly mixing Bernoulli actions of any possible Krieger's type.
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