Point-deletion inclusion: Difference between revisions

Definition

Let ${\displaystyle M}$ be a topological space and ${\displaystyle p\in M}$ a (closed) point. The point-deletion inclusion problem studies the map induced on homology, fundamental groups and other homotopy invariants by the inclusion of ${\displaystyle M\setminus p}$ in ${\displaystyle M}$ viz the homomorphisms:

${\displaystyle H_{i}(M\setminus p)\to H_{i}(M)}$

Effect on homology

For a homologically Euclidean point

If ${\displaystyle p}$ is a ${\displaystyle n}$-homologically Euclidean point viz if ${\displaystyle H_{n}(M,M\setminus p)=\mathbb {Z} }$ and ${\displaystyle H_{i}(M,M\setminus p)=0}$ for ${\displaystyle i\neq n}$, then the long exact sequence of homology of a pair ${\displaystyle (M,M\setminus p)}$ yields that for ${\displaystyle i\neq n,n-1}$, the inclusion induces an isomorphism on ${\displaystyle i^{th}}$ homology.

For a manifold

If ${\displaystyle M}$ is a manifold of dimension ${\displaystyle n}$, then every point ${\displaystyle p}$ is homologically Euclidean, so ${\displaystyle H_{i}(M\setminus p)\to H_{i}(M)}$ is an isomorphism for ${\displaystyle i\neq n,n-1}$. What happens at ${\displaystyle n,n-1}$ depends on the nature of the manifold.

• If ${\displaystyle M}$ is a compact connected orientable manifold, then the map:

${\displaystyle H_{n}(M)\to H_{n}(M,M\setminus p)}$

is an isomorphism, and hence we see that ${\displaystyle H_{n}(M\setminus p)=0}$, while the map ${\displaystyle H_{n-1}(M\setminus p)\to H_{n-1}(M)}$ is an isomorphism.

• If ${\displaystyle H_{n}(M)=0}$ (which could occur if ${\displaystyle M}$ is compact non-orientable, or where ${\displaystyle M}$ is non-compact), then ${\displaystyle H_{n}(M\setminus p)=0}$, and we get:

${\displaystyle H_{n-1}(M\setminus p)=H_{n-1}(M)\oplus H_{n}(M,M\setminus p)=H_{n-1}(M)\oplus \mathbb {Z} }$

(the proof of this relies on getting a splitting of a short exact sequence; the splitting is not canonical.

Note that in both cases, ${\displaystyle H_{n}(M\setminus p)=0}$; but in the second case, the map is an isomorphism on ${\displaystyle n^{th}}$ homology while n the first case the map is an isomorphism on ${\displaystyle (n-1)^{th}}$ homology.

Effect on fundamental group

• Point-deletion inclusion induces isomorphism on fundamental groups for manifold of dimension at least two

See also: multiple point-deletion inclusion, submanifold-deletion inclusion