Generic measure preserving transformations and the closed groups they generate

Abstract

We show that, for a generic measure preserving transformation T, the closed group generated by T is not isomorphic to the topological group L0(λ, T) of all Lebesgue measurable functions from [0,1] to T (taken with pointwise multiplication and the topology of convergence in measure). This result answers a question of Glasner and Weiss. The main step in the proof consists of showing that Koopman representations of ergodic boolean actions of L0(λ, T) possess a non-trivial spectral property not shared by all unitary representations of L0(λ, T). The main tool underlying our arguments is a theorem on the form of unitary representations of L0(λ, T) from our earlier work.