Actions of groups of foliated homeomorphisms on spaces of leaves

Abstract

Let be a foliation on a topological manifold X, Y be the space of leaves, and p: X Y be the natural projection. Endow Y with the factor topology with respect to p. Then the group H(X, ) of foliated (i.e. mapping leaves onto leaves) homeomorphisms of X naturally acts on the space of leaves Y, which gives a homomorphism : H(X, ) H(Y). We present sufficient conditions when is continuous with respect to the corresponding compact open topologies. In fact similar results hold not only for foliations but for a more general class of partitions of locally compact Hausdorff spaces X.