Correspondence between diffeomorphism groups and singular foliations

Abstract

It is well-known that any isotopically connected diffeomorphism group G of a manifold determines uniquely a singular foliation G. A one-to-one correspondence between the class of singular foliations and a subclass of diffeomorphism groups is established. As an illustration of this correspondence it is shown that the commutator subgroup [G,G] of an isotopically connected, factorizable and non-fixing Cr-diffeomorphism group G is simple iff the foliation [G,G] defined by [G,G] admits no proper minimal sets. In particular, the compactly supported e-component of the leaf preserving C∞-diffeomorphism group of a regular foliation is simple iff has no proper minimal sets.