Diffeomorphism groups of non-compact manifolds endowed with the Whitney Cinfty-topology

Abstract

Suppose M is a non-compact connected n-manifold without boundary, DD(M) is the group of C∞-diffeomorphisms of M endowed with the Whitney C∞-topology and DD0(M) is the identity connected component of DD(M), which is an open subgroup in the group DDc(M) ⊂ DD(M) of compactly supported diffeomorphisms of M. It is shown that DD0(M) is homeomorphic to N × IR∞ for an l2-manifold N whose topological type is uniquely determined by the homotopy type of DD0(M). For instance, DD0(M) is homeomorphic to l2 × IR∞ if n = 1, 2 or n = 3 and M is orientable and irreducible. We also show that for any compact connected n-manifold N with non-empty boundary ∂ N the group DD0(N - ∂ N) is homeomorphic to DD0(N; ∂ N) × IR∞, where DD0(N;∂ N) is the identity component of the group DD(N;∂ N) of diffeomorphisms of N that do not move points of the boundary ∂ N.