We prove the stochastic stability of an open class of partially hyperbolic diffeomorphisms, each of which admits two centers $E^c_1$ and $E^c_2$ such that any Gibbs $u$-state admits only positive (resp. negative) Lyapunov exponents along $E^c_1$ (resp. $E^c_2$).
Physical measures for partially hyperbolic diffeomorphisms with mixed hyperbolicity
Topological Entropy and Partially Hyperbolic Diffeomorphisms
Stochastic stability at the boundary of expanding maps
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