Automorphism groups of rigid geometries on leaf spaces of foliations

Abstract

We introduce a category of rigid geometries on singular spaces which are leaf spaces of foliations and are considered as leaf manifolds. We single out a special category F0 of leaf manifolds containing the orbifold category as a full subcategory. Objects of F0 may have non-Hausdorff topology unlike the orbifolds. The topology of some objects of F0 does not satisfy the separation axiom T0. It is shown that for every N∈ Ob( F0) a rigid geometry ζ on N admits a desingularization. Moreover, for every such N we prove the existence and the uniqueness of a finite dimensional Lie group structure on the automorphism group Aut(ζ) of the rigid geometry ζ on N.