Noncommutative Topological Dynamics. II
Copyright policy )Noncommutative Topological Dynamics. II
This part deals with almost periodic and weakly mixing C ∗ {C^ \ast } -flows, and with disjointness and weak disjointness of C ∗ {C^ \ast } -flows (flows on C ∗ {C^ \ast } -algebras). The main result is a generalization to C ∗ {C^ \ast } -flows of Keynes and Robertson’s characterization of minimal weakly mixing flows. Examples are discussed exhibiting anomalous behaviour of disjointness in the C ∗ {C^ \ast } -flow case.
\(C^*\)-dynamical system, \(C^*\)-dynamical systems from the point of view of topological dynamics, \(C^*\)-flows, ergodicity, characterization of minimal weakly mixing flows, Noncommutative dynamical systems, minimality, almost periodic and weakly mixing \(C^*\)-flows
\(C^*\)-dynamical system, \(C^*\)-dynamical systems from the point of view of topological dynamics, \(C^*\)-flows, ergodicity, characterization of minimal weakly mixing flows, Noncommutative dynamical systems, minimality, almost periodic and weakly mixing \(C^*\)-flows
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