Representations of Dynamical Systems on Banach Spaces

“…In particular, representations on Banach spaces without a copy of l 1 (we call them Rosenthal Banach spaces) play a very important role in this hierarchy. According to the Rosenthal l 1 -dichotomy [36], and the corresponding Dynamical Bourgin-Fremlin-Talagrand dichotomy [13,15], there is a sharp dichotomy for metrizable dynamical systems; either their enveloping semigroup is of cardinality smaller or equal to that of the continuum, or it is very large and contains a copy of the Stone-Čech compactification of N (the set of natural numbers).…”

“…For compact metrizable systems X the two concepts discussed above coincide: (G, X) is tame iff it is Rosenthal representable. The case of metrizable X admits also interesting enveloping semigroup characterization: (G, X) is tame iff every element p ∈ E(G, X) is a Baire class 1 function p : X → X (see [19,15]). Recall that the enveloping semigroup E(G, X) of a compact G-system X is the pointwise closure of the set of all g-translations X → X (g ∈ G) in X X .…”

“…Definition 1.1. (See [29,13,15]) A representation of an action G X on a Banach space V is a pair (h, α), where h : G → Is(V ) is a strongly continuous cohomomorphism and α : X → V * is a weak-star continuous bounded map into the dual of V such that (h, α) respect the original action and the induced dual action. That is, v, α(gx) = h(g)(v), α(x) for all v ∈ V, g ∈ G, x ∈ X.…”

Group actions on treelike compact spaces

“…In particular, representations on Banach spaces without a copy of l 1 (we call them Rosenthal Banach spaces) play a very important role in this hierarchy. According to the Rosenthal l 1 -dichotomy [36], and the corresponding Dynamical Bourgin-Fremlin-Talagrand dichotomy [13,15], there is a sharp dichotomy for metrizable dynamical systems; either their enveloping semigroup is of cardinality smaller or equal to that of the continuum, or it is very large and contains a copy of the Stone-Čech compactification of N (the set of natural numbers).…”

“…For compact metrizable systems X the two concepts discussed above coincide: (G, X) is tame iff it is Rosenthal representable. The case of metrizable X admits also interesting enveloping semigroup characterization: (G, X) is tame iff every element p ∈ E(G, X) is a Baire class 1 function p : X → X (see [19,15]). Recall that the enveloping semigroup E(G, X) of a compact G-system X is the pointwise closure of the set of all g-translations X → X (g ∈ G) in X X .…”

“…Definition 1.1. (See [29,13,15]) A representation of an action G X on a Banach space V is a pair (h, α), where h : G → Is(V ) is a strongly continuous cohomomorphism and α : X → V * is a weak-star continuous bounded map into the dual of V such that (h, α) respect the original action and the induced dual action. That is, v, α(gx) = h(g)(v), α(x) for all v ∈ V, g ∈ G, x ∈ X.…”

Group actions on treelike compact spaces

“…The last decade saw an increased interest in tame systems (see, for example, ; see also for an up to date account) revealing their connections to other areas of mathematics like Banach spaces , circularly ordered systems , substitutions and tilings, quasicrystals, cut and project schemes, and even model theory and logic . A major breakthrough in the general understanding of tameness was achieved by Glasner's recent structural result for tame minimal systems .…”

On tameness of almost automorphic dynamical systems for general groups

“…Such families play a major role in the theory of tame dynamical systems. See, for example, [12,11,14,15,16].…”

A note on tameness of families having bounded variation