Score contribution per author:
α: calibrated so average coauthorship-adjusted count equals average raw count
In this note we discuss necessary and sufficient conditions for dynamic path controllability, and show that the rank condition in Aoki (1975) is necessary but not sufficient unless impulse controls are admissible. It is demonstrated that in the special case of state space targets Tinbergen's concept of static controllability is equivalent to the dynamic concept of path controllability. For general linear systems conditions for path controllability depend on the choice of the admissible target and instrument space. In contrast to discrete-time models Tinbergen's original counting rule is necessary for path controllability for any target and instrument space in the continuous-time framework.