Free products and the algebraic structure of diffeomorphism groups

Abstract

Let M be a compact one--manifold, and let Diff1+bv(M) denote the group of C1 orientation preserving diffeomorphisms of M whose first derivatives have bounded variation. We prove that if G is a group which is not virtually metabelian, then (G×Z)*Z is not realized as a subgroup of Diff1+bv(M). This gives the first examples of finitely generated groups G,H Diff+∞(M) such that G H does not embed into Diff1+bv(M). By contrast, for all countable groups G,H+(M) there exists an embedding G H Homeo+(M). We deduce that many common groups of homeomorphisms do not embed into Diff1+bv(M), for example the free product of Z with Thompson's group F. We also complete the classification of right-angled Artin groups which can act smoothly on M and in particular, recover the main result of a joint work of the authors with Baik. Namely, a right-angled Artin group A() either admits a faithful C∞ action on M, or A() admits no faithful C1+bv action on M. In the former case, A()Πi Gi where Gi is a free product of free abelian groups. Finally, we develop a hierarchy of right-angled Artin groups, with the levels of the hierarchy corresponding to the number of semi-conjugacy classes of possible actions of these groups on S1.