Mutliple mixing and disjointness for time changes of bounded-type Heisenberg nilflows
Abstract
We study time changes of bounded type Heisenberg nilflows (φt) acting on the Heisenberg nilmanifold M. We show that for every positive τ∈ Ws(M), s~>~7/2, every non-trivial time change (φtτ) enjoys the Ratner property. As a consequence every mixing time change is mixing of all orders. Moreover we show that for every τ∈ Ws(M), s>9/2 and every p,q∈ N, p≠ q, (φptτ) and (φqtτ) are disjoint. As a consequence Sarnak's Conjecture on M\"obius disjointness holds for all such time changes.
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