Classification of differentiable structures on the non-Hausdorff line with two origins

Abstract

We classify differentiable structures on a line L with two origins being a non-Hausdorff but T1 one-dimensional manifold obtained by ``doubling'' 0. For k∈N\∞\ let H be the group of homeomorphisms h of R such that h(0)=0 and the restriction of h to R0 is a Ck-diffeomorphism. Let also D be the subgroup of H consisting of Ck-diffeomorphisms of R also fixing 0. It is shown that there is a natural bijection between Ck-structures on L (up to a Ck-diffeomorphism fixing both origins) and double D-coset classes D H / D = \ D h D h ∈ H\. Moreover, the set of all Ck-structures on L (up to a Ck-diffeomorphism which may also exchange origins) are in one-to-one correspondence with the set of double (D,)-coset classes D H / D = \ D h D D h-1 D h ∈ H\. In particular, in contrast with the real line, the line with two origins L admits uncountably many pair-wise non-diffeomorphic Ck-structures for each k=1,2,…,∞.