Banach Representations and Affine Compactifications of Dynamical Systems

Abstract: To every Banach space V we associate a compact right topological affine semigroup E(V ). We show that a separable Banach space V is Asplund if and only if E(V ) is metrizable, and it is Rosenthal (i.e. it does not contain an isomorphic copy of l 1 ) if and only if E(V ) is a Rosenthal compactum. We study representations of compact right topological semigroups in E(V ). In particular, representations of tame and HNS-semigroups arise naturally as enveloping semigroups of tame and HNS (hereditarily non-sensitive)… Show more

“…This question is closely related to the setting of this work. Indeed, by [4] (Prop. 6.13) (resp., by [4] (Cor.…”

“…Indeed, by [4] (Prop. 6.13) (resp., by [4] (Cor. 6.20)) the metrizability (first countability) of P guarantees that the corresponding algebra is a subset of Asp(G) (resp.…”

“…One of the most useful references about semigroup compactifications is a book of Berglund, Junghenn and Milnes [9]. For some new directions (regarding topological groups) see also [3,4,15,16].…”

“…Hence, P is metrizable. If we assume that γ is a semigroup compactification then the separability of A f guarantees by [4] ( Prop. 6.13) that A f ⊂ Asp(G).…”

“…The WAP triviality of H + [0, 1] was conjectured by Pestov. Recall also that for G := H + [0, 1] every Asplund (hence also every WAP) function is constant and every continuous representation G → Iso(V) on an Asplund (hence also reflexive) space V must be trivial [3]. In contrast one may show (see [4,5]) that H + [0, 1] is representable on a (separable) Rosenthal space (a Banach space is Rosenthal if it does not contain a subspace topologically isomorphic to l 1 ).…”

A Note on the Topological Group c0

“…This question is closely related to the setting of this work. Indeed, by [4] (Prop. 6.13) (resp., by [4] (Cor.…”

“…Indeed, by [4] (Prop. 6.13) (resp., by [4] (Cor. 6.20)) the metrizability (first countability) of P guarantees that the corresponding algebra is a subset of Asp(G) (resp.…”

“…One of the most useful references about semigroup compactifications is a book of Berglund, Junghenn and Milnes [9]. For some new directions (regarding topological groups) see also [3,4,15,16].…”

“…Hence, P is metrizable. If we assume that γ is a semigroup compactification then the separability of A f guarantees by [4] ( Prop. 6.13) that A f ⊂ Asp(G).…”

“…The WAP triviality of H + [0, 1] was conjectured by Pestov. Recall also that for G := H + [0, 1] every Asplund (hence also every WAP) function is constant and every continuous representation G → Iso(V) on an Asplund (hence also reflexive) space V must be trivial [3]. In contrast one may show (see [4,5]) that H + [0, 1] is representable on a (separable) Rosenthal space (a Banach space is Rosenthal if it does not contain a subspace topologically isomorphic to l 1 ).…”

A Note on the Topological Group c0

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