Riedel and Sass (2013) propose a framework for normal form games where
players can use imprecise probabilistic devices. We extend this strategic use of
objective ambiguity to extensive form games. We show that with rectangularity
of Ellsberg strategies we have dynamic consistency in the sense of Kuhn (1953):
rectangular Ellsberg strategies are equivalent to Ellsberg behavior strategies.
We provide an example for our result and define Ellsberg equilibrium in such
extensive form Ellsberg games.