On stochastic stability of non-uniformly expanding interval maps (Q2864128)

Let \(f:[0,1]\to [0,1]\) be \(C^3\) multimodal interval map with no attracting cycles and non-flat critical points. Further, assume that the function satisfies a summability condition of exponent one, i.e., \(\sum_{n=0}^\infty \frac{1}{|D^n(f(v))|}<\infty\) for any critical value \(v\). Choose independent random maps \(g_n\) from a space \(\Omega\) containing \(f\) which may be in some case a small neighbourhood of \(f\) in the \(C^2\) topology. Then under general conditions on the perturbations, a typical random orbit \(g_n\circ ...\circ g_0(x)\) has ``roughly the same distribution as a typical orbit of \(f\)'' or more precisely, strong stochastic stability is shown.