Differentiable structures on a union of two open sets

Abstract

In a recent paper the authors classified differentiable structures on the non-Hausdorff one-dimensional manifold L called the line with two origins which is obtained by gluing two copies of the real line R via the identity homeomorphism of R 0. Here we give a classification of differentiable structures on another non-Hausdorff one-dimensional manifold Y (called letter "Y") obtained by gluing two copies of R via the identity map of positive reals. It turns out that, in contrast to the real line, for every r=1,…,∞, both manifolds L and Y admit uncountably many pair-wise non-diffeomorphic Ck-structures. We also observe that the proofs of these classifications are very similar. This allows to formalize the arguments and extend them to a certain general statement about arrows in arbitrary categories.