Abstract:Let $M(G)$ denote the phase space of the universal minimal dynamical system for a group $G$. Our aim is to show that $M(G)$ is homeomorphic to the absolute of $D^{2^\omega }$, whenever $G$ is a countable Abelian group.
Keywords: dynamical system, universal minimal dynamical system, Abelian group, absolute
AMS Subject Classification: 54H20