Si considera l'equazione differenziale stocastica del tipo \begin{equation}\tag{1}dX(t) = a(X(t); \xi(t)) \, dt + \int_\Theta b(X(t); \theta) \mathcal{N}_p(dt; d\theta)\end{equation} per $t \geq 0$ con condizione iniziale $X(0) = x_0$. Diamo condizioni sufficienti per la stabilità delle soluzioni che generano il semigruppo degli operatori di Markov.
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