Lifting dynamical properties to hyperspaces and hyperspace suspension (Q2922055)

Let \((X,f)\) be a dynamical system, where \(X\) is a compact metric space and \(f\) is a (continuous) selfmap of \(X\). The following are the main results in this paper:NEWLINENEWLINE{ Theorem 1.}NEWLINENEWLINEa) If \(f\) is transitive (totally transitive), then the induced map \(g\) on \((C(X),\tau_U)\) is transitive (totally transitive)NEWLINENEWLINEb) If \(f\) is mixing (weakly mixing), then the induced map \(g\) on \((C(X),\tau_U)\) is mixing (weakly mixing)NEWLINENEWLINEc) If \(f\) is mixing (weakly mixing) and \(X\) is path connected, then the induced map \(g\) on \((C(X),\tau_L)\) is mixing (weakly mixing).NEWLINENEWLINE{ Theorem 2.}NEWLINENEWLINEa) If \((C(X),g)\) is transitive (totally transitive), then \((HS(X),HS(f))\) is transitive (totally transitive)NEWLINENEWLINEb) If \((C(X),g)\) is mixing (weakly mixing), then \((HS(X),HS(f))\) is mixing (weakly mixing)NEWLINENEWLINEc) if \((C(X),g)\) is topologically exact, then \((HS(X),HS(f))\) is topologically exact.NEWLINENEWLINESome other aspects occasioned by these results are also discussed.