Todorcević' trichotomy and a hierarchy in the class of tame dynamical systems

Abstract: Todorcević' trichotomy in the class of separable Rosenthal compacta induces a hierarchy in the class of tame (compact, metrizable) dynamical systems (X, T ) according to the topological properties of their enveloping semigroups E(X). More precisely, we define the classeswhere Tame 1 is the proper subclass of tame systems with first countable E(X), and Tame 2 is its proper subclass consisting of systems with hereditarily separable E(X). We study some general properties of these classes and exhibit many examples… Show more

“…If K is metrizable then it is equivalent to say that the enveloping semigroup E(K) is "small"; namely, a separable Rosenthal compact space (see [15,16]). In view of a hierarchy of tame metric dynamical systems (see [19]) induced by the Todorcević' Trichotomy for Rosenthal compact spaces, we ask the following Question 1.4. Which (c-)orderly topological groups G admit an effective (c-)ordered action on a compact metrizable space K such that the enveloping semigroup E(K) is: a) metrizable?…”

“…Deep results of Todorcević [32] and Argyros-Dodos-Kanellopoulos [1, Section 4.3.7]) about separable Rosenthal compacta, lead to a hierarchy of tame metric dynamical systems (see [19]) according to topological properties of corresponding enveloping semigroups. In view of this hierarchy we ask the following Question 4.10.…”

“…Ordered dynamical systems were studied in several recent publications concerning tame systems, Sturmian like circularly ordered symbolic systems and some dynamical generalizations of the amenability concept. See joint works with Eli Glasner [16,17,18,19] and also [27]. Investigation of order-preserving compact dynamical systems provides natural framework to study orderable groups (and the orderability itself).…”

“…The second reason comes from our papers [16,17,19] with Eli Glasner, where we study Sturmian like and other circularly ordered dynamical systems. In many such cases, the enveloping semigroup is a circularly ordered semigroup.…”

Orderable groups and semigroup compactifications

“…If K is metrizable then it is equivalent to say that the enveloping semigroup E(K) is "small"; namely, a separable Rosenthal compact space (see [15,16]). In view of a hierarchy of tame metric dynamical systems (see [19]) induced by the Todorcević' Trichotomy for Rosenthal compact spaces, we ask the following Question 1.4. Which (c-)orderly topological groups G admit an effective (c-)ordered action on a compact metrizable space K such that the enveloping semigroup E(K) is: a) metrizable?…”

“…Deep results of Todorcević [32] and Argyros-Dodos-Kanellopoulos [1, Section 4.3.7]) about separable Rosenthal compacta, lead to a hierarchy of tame metric dynamical systems (see [19]) according to topological properties of corresponding enveloping semigroups. In view of this hierarchy we ask the following Question 4.10.…”

“…Ordered dynamical systems were studied in several recent publications concerning tame systems, Sturmian like circularly ordered symbolic systems and some dynamical generalizations of the amenability concept. See joint works with Eli Glasner [16,17,18,19] and also [27]. Investigation of order-preserving compact dynamical systems provides natural framework to study orderable groups (and the orderability itself).…”

“…The second reason comes from our papers [16,17,19] with Eli Glasner, where we study Sturmian like and other circularly ordered dynamical systems. In many such cases, the enveloping semigroup is a circularly ordered semigroup.…”

Orderable groups and semigroup compactifications

“…A Banach space V does not contain an l 1 -sequence (equivalently, does not contain an isomorphic copy of l 1 ) if and only if every bounded sequence in V has a weak-Cauchy subsequence [27]. As in [8,9,10], we call a Banach space satisfying these equivalent conditions a Rosenthal space. Every reflexive space is Asplund and every Asplund is Rosenthal.…”

Topological group actions by group automorphisms and Banach representations