Boundedness of diffeomorphism groups of manifold pairs -- Circle case --

Abstract

In this paper we study boundedness of conjugation invariant norms on diffeomorphism groups of manifold pairs. For the diffeomorphism group D Diff(M,N)0 of a closed manifold pair (M, N) with N ≥ 1, first we clarify the relation among the fragmentation norm, the conjugation generated norm, the commutator length cl and the commutator length with support in balls clb and show that D is weakly simple relative to a union of some normal subgroups of D. For the boundedness of these norms, this paper focuses on the case where N is a union of m circles. In this case, the rotation angle on N induces a quasimorphism : Isot(M, N)0 Rm, which determines a subgroup A of Zm and a function : D Rm/A. If rank\,A = m, these data leads to an upper bound of clb on D modulo the normal subgroup G Diffc(M - N)0. Then, some upper bounds of cl and clb on D are obtained from those on G. As a consequence, the group D is uniformly weakly simple and bounded when M ≠ 2,4. On the other hand, if rank\,A < m, then the group D admits a surjective quasimorphism, so it is unbounded and not uniformly perfect. We examine the group A in some explicit examples.