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Could someone give me an example of a (smooth) $n$-manifold $(n=2, 3)$ which cannot be embedded (or immersed) in $\mathbb R^4$?

Thanks in advance!

S. L.

2 Answers 2

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All 2-manifolds embed in $\mathbb R^4$.

For $3$-manifolds, $\mathbb RP^3$ doesn't embed in $\mathbb R^4$. An interesting aspect for 3-manifolds in $\mathbb R^4$ is the subject fractures into tame topological embeddings and smooth/PL embeddings. For example, Poincare Dodecahedral space has a tame topological embedding in $\mathbb R^4$ but not a smooth or PL-embedding.

If you want more examples, check out this pre-print: http://front.math.ucdavis.edu/0810.2346

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    Cheers! And some random text...2010-11-29
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No compact nonorientable $(n-1)$-manifold embeds in $\mathbb R^n$: this follows from the Alexander duality theorem.

Immersibility is a harder problem....

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    From the homotopy theory perspective immersibility amounts to finding tangent bundle immersions. There's no similar reduction for embedding problems.2011-06-10