A minimal PI cascade with 2c minimal ideals

Abstract

We first improve an old result of McMahon and show that a metric minimal flow whose enveloping semigroup contains less than 2c (where c =20) minimal left ideals is PI. Then we show the existence of various minimal PI flows with many minimal left ideals, as follows. For the acting group G=SL2(R)N, we construct a metric minimal PI G-flow with c minimal left ideals. We then use this example and results established in GW-79 to construct a metric minimal PI cascade (X,T) with c minimal left ideals. We go on and construct an example of a minimal PI-flow (Y, G) on a compact manifold Y and a suitable path-wise connected group G of homeomorphism of Y, such that the flow (Y, G) is PI and has 2c minimal left ideals. Finally, we use this latter example and a theorem of Dirb\'ak to construct a cascade (X, T) which is PI (of order 3) and has 2c minimal left ideals. Thus this final result shows that, even for cascades, the converse of the implication "less than 2c minimal left ideals implies PI", fails.