Branched Covers of Open Manifolds
Abstract
For m=2 and m=3 we prove that any connected, oriented, open manifold Mm admits a simple branched covering map over Rm. When M has k ends and k is finite, the degree of the cover can be taken to be mk. Regardless of the number of ends, M admits a branched covering map of countably infinite degree over Rm. We also investigate which compact manifolds are universal bases, that is, are branch covered by all compact manifolds in the same dimension.
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