We show that if an automorphism of a non-abelian free group $F_n$ is irreducible with irreducible powers, it acts on
the boundary of Culler–Vogtmann’s outer space with north–south dynamics: there are two fixed points, one attracting
and one repelling, and orbits accumulate only on these points. The main new tool we use is the equivariant assignment
of a point $Q(X)$ to any end $X\in\partial F_n$, given an action of $F_n$ on an $\bm{R}$-tree $T$ with trivial arc
stabilizers; this point $Q(X)$ may be in $T$, or in its metric completion, or in its boundary.
AMS 2000 Mathematics subject classification: Primary 20F65; 20E05; 20E08
