On minimal actions of countable groups
Abstract
Our purpose here is to review some recent developments in the theory of dynamical systems whose common theme is a link between minimal dynamical systems, certain Ramsey type combinatorial properties, and the Lovasz local lemma (LLL). For a general countable group G the two classes of minimal systems we will deal with are (I) the minimal subsystems of the subgroup system (Sub(G), G), called URS's (uniformly recurrent subgroups), and (II) minimal subshifts; i.e. subsystems of the binary Bernoulli G-shift (0, 1G, gg ∈ G).
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