Homeotopy groups of leaf spaces of one-dimensional foliations on non-compact surfaces with non-compact leaves

Abstract

Let Z be a non-compact two-dimensional manifold obtained from a family of open strips R×(0,1) with boundary intervals by gluing those strips along some pairs of their boundary intervals. Every such strip has a natural foliation into parallel lines R× t, t∈(0,1), and boundary intervals which gives a foliation on all of Z. Denote by H(Z,) the group of all homeomorphisms of Z that maps leaves of onto leaves and by H(Z/) the group of homeomorphisms of the space of leaves endowed with the corresponding compact open topologies. Recently, the authors identified the homeotopy group π0H(Z,) with a group of automorphisms of a certain graph G with the additional structure which encodes the combinatorics of gluing Z from strips. That graph is in a certain sense dual to the space of leaves Z/. On the other hand, for every h∈H(Z,) the induced permutation k of leaves of is in fact a homeomorphism of Z/ and the correspondence h k is a homomorphism :H()(Z/). The aim of the present paper is to show that induces a homomorphism of the corresponding homeotopy groups 0:π0H(Z,)π0H(Z/) which turns out to be either injective or having a kernel Z2. This gives a dual description of π0H(Z,) in terms of the space of leaves.