The continuity of Darboux injections between manifolds
Abstract
We prove that an injective map f:X Y between connected metrizable spaces X,Y is continuous if for every connected subset C⊂ X the image f(C) is connected and one of the following conditions is satisfied: (1) Y is a 1-manifold and X is compact; (2) Y is a 2-manifold and X is a closed n-manifold of dimension n 2; (3) Y is a 3-manifold and X is a simply-connected closed n-manifold of dimension n 3. This gives a partial answer to a problem of Willie Wong, posed on Mathoverflow.
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