On the maximal spectral type of nilsystems
Abstract
Let (G/,Ra) be an ergodic k-step nilsystem for k≥ 2. We adapt an argument of Parry to show that L2(G/) decomposes as a sum of a subspace with discrete spectrum and a subspace of Lebesgue spectrum with infinite multiplicity. In particular, we generalize a result previously established by Host, Kra and Maass for 2-step nilsystems and a result by Stepin for nilsystems G/ with connected, simply connected G.
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