Smooth embeddings of the Long Line and other non-paracompact manifolds into locally convex spaces

Abstract

We show that every finite dimensional Hausdorff (not necessarily paracompact, not necessarily second countable) Cr-manifold can be embedded into a weakly complete vector space, i.e. a locally convex topological vector space of the form RI for an uncountable index set I and determine the minimal cardinality of I for which such an embedding is possible.