Foliated and compactly supported isotopies of regular neighborhoods

Abstract

Let F be a foliation with a "singular" submanifold B on a smooth manifold M and p:E B be a regular neighborhood of B in M. Under certain "homogeneity" assumptions on F near B we prove that every leaf preserving diffeomorphism h of M is isotopic via a leaf preserving isotopy to a diffeomorphism which coincides with some vector bundle morphism of E near B. This result is mutually a foliated and compactly supported variant of a well known statement that every diffeomorphism h of Rn fixing the origin is isotopic to the linear isomorphism induced by its Jacobi matrix of h at 0. We also present applications to the computations of the homotopy type of the group of leaf preserving diffeomorphisms of F.