Homeotopy groups of rooted tree like non-singular foliations on the plane

Abstract

Let F be a non-singular foliation on the plane with all leaves being closed subsets, H+(F) be the group of homeomorphisms of the plane which maps leaves onto leaves endowed with compact open topology, and H+0(F) be the identity path component of H+(F). The quotient π0 H+(F) = H+(F)/H+0(F) is an analogue of a mapping class group for foliated homeomorphisms. We will describe the algebraic structure of π0 H+(F) under an assumption that the corresponding space of leaves of F has a structure similar to a rooted tree of finite diameter.