Recurrence in the dynamical system (X, Tss∈ S) and ideals of β S

Abstract

A dynamical system\/ is a pair (X, Tss∈ S), where X is a compact Hausdorff space, S is a semigroup, for each s∈ S, Ts is a continuous function from X to X, and for all s,t∈ S, Ts Tt=Tst. Given a point p∈β S, the Stone- Cech compactification of the discrete space S, Tp:X X is defined by, for x∈ X, Tp(x)=p-\!s∈ STs(x). We let β S have the operation extending the operation of S such that β S is a right topological semigroup and multiplication on the left by any point of S is continuous. Given p,q∈β S, Tp Tq=Tpq, but Tp is usually not continuous. Given a dynamical system (X, Tss∈ S), and a point x∈ X, we let U(x)=\p∈β S:Tp(x) is uniformly recurrent\. We show that each U(x) is a left ideal of β S and for any semigroup we can get a dynamical system with respect to which K(β S)=x∈ XU(x) and c K(β S)=\U(x):x∈ X and U(x) is closed\. And we show that weak cancellation assumptions guarantee that each such U(x) properly contains K(β S) and has U(x) c K(β S)≠ .