Asymptotically unitary equivalence and asymptotically inner automorphisms

Let $C$ be a unital AH-algebra and let $A$ be a unital separable simple \CA with tracial rank zero. Suppose that $\phi_1, \phi_2: C\to A$ are two unital monomorphisms. We show that there is a continuous path of unitaries $\{u_t: t\in [0, \infty)\}$ of $A$ such that $$ \lim_{t\to\infty}u_t^*\phi_1(a)u_t=\phi_2(a)\tforal a\in C $$ if and only if $[\phi_1]=[\phi_2]$ in $KK(C,A),$ $\tau\circ \phi_1=\tau\circ \phi_2$ for all $\tau\in T(A)$ and the rotation map ${\tilde\eta}_{\phi_1,\phi_2}$ associated with $\phi_1$ and $\phi_2$ is zero. In particular, an automorphism $\af$ on a unital separable simple \CA $A$ in ${\cal N}$ with tracial rank zero is asymptotically inner if and only if $$ [\af]=[{\rm id}_A] \text{in} KK(A,A) $$ and the rotation map ${\tilde\eta}_{\phi_1, \phi_2}$ is zero. Let $A$ be a unital AH-algebra (not necessarily simple) and let $\af\in Aut(A)$ be an automorphism. As an application, we show that the associated crossed product $A\rtimes_{\af}\Z$ can be embedded into a unital simple AF-algebra if and only if $A$ admits a strictly positive $\af$-invariant tracial state.