We prove that finding a rooted subtree with at least k leaves in a digraph
is a fixed parameter tractable problem. A similar result holds for finding
rooted spanning trees with many leaves in digraphs from a wide family L
that includes all strong and acyclic digraphs. This settles completely an open
question of Fellows and solves another one for digraphs in L. Our
algorithms are based on the following combinatorial result which can be viewed
as a generalization of many results for a `spanning tree with many leaves' in
the undirected case, and which is interesting on its own: If a digraph D∈L of order n with minimum in-degree at least 3 contains a rooted
spanning tree, then D contains one with at least (n/2)1/5−1 leaves