A family of distal functions and multipliers for strict ergodicity

Abstract

We give two proofs to an old result of E. Salehi, showing that the Weyl subalgebra W of ∞(Z) is a proper subalgebra of D, the algebra of distal functions. We also show that the family Sd of strictly ergodic functions in D does not form an algebra and hence in particular does not coincide with W. We then use similar constructions to show that a function which is a multiplier for strict ergodicity, either within D or in general, is necessarily a constant. An example of a metric, strictly ergodic, distal flow is constructed which admits a non-strictly ergodic 2-fold minimal self-joining. It then follows that the enveloping group of this flow is not strictly ergodic (as a T-flow). Finally we show that the distal, strictly ergodic Heisenberg nil-flow is relatively disjoint over its largest equicontinuous factor from |W|.

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