Simply connected at infinity - Alchetron, the free social encyclopedia

In topology, a branch of mathematics, a topological space X is said to be simply connected at infinity if for all compact subsets C of X, there is a compact set D in X containing C so that the induced map

π 1 ( X − D ) → π 1 ( X − C )

is trivial. Intuitively, this is the property that loops far away from a small subspace of X can be collapsed, no matter how bad the small subspace is.

The Whitehead manifold is an example of a 3-manifold that is contractible but not simply connected at infinity. Since this property is invariant under homeomorphism, this proves that the Whitehead manifold is not homeomorphic to R³.

However, it is a theorem of John R. Stallings that for n ≥ 5 , a contractible n-manifold is homeomorphic to Rⁿ precisely when it is simply connected at infinity.

References

Simply connected at infinity Wikipedia

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