Let $M$ be a closed $3$-manifold, and let $X_t$ be a transitive Anosov flow.We construct a diffeomorphism of the form $f(p)=Y_{t(p)}(p)$, where $Y$ is anAnosov flow equivalent to $X$. The diffeomorphism $f$ is structurallystable (satisfies Axiom A and the strong transversalitycondition); the non-wandering set of $f$ is the union of a transitiveattractor and a transitive repeller; and $f$ is also partiallyhyperbolic (the direction $\RR.Y$ is the central bundle).