Hirsch foliations in codimension greater than one
by Andrzej Bis, Steven Hurder and Joesph Shive

ABSTRACT:

We generalize the Hirsch construction of a smooth foliation on a 3-manifold with a unique exceptional minimal set, to obtain a method for constructing smooth foliations of arbitrary codimension with exotic minimal sets. The method also yields a procedure to realize a given system of etale correspondences as the holonomy of a smooth foliation of a compact manifold. This generalizes the well-known group suspension construction.