Stably commuting dynamics and stationary states (Q1100408)

We consider the following problem: let \(\omega\) be a \(\alpha_ t\)- stationary state of a given \(C^*\)-algebra, i.e. \(\omega_ 0\alpha_ t=\omega\) and \(\gamma_ t\) another dynamics. What (nontrivial) features can be allowed for \(\gamma_ t\) such that \(\omega\) is also \(\alpha \gamma_ t\)-stationary state? A sufficient answer is described, in which the notion of stable commutation between \(\alpha_ t\) and \(\gamma_ t\) is needed.