We study the set M of pairs (f; V ), defined by an endomorphism f of Fn and a d-
dimensional f–invariant subspace V . It is shown that this set is a smooth manifold that
defines a vector bundle on the Grassmann manifold. We apply this study to derive conditions
for the Lipschitz stability of invariant subspaces and determine versal deformations of the
elements of M with respect to a natural equivalence relation introduced on it
