Sphere: Difference between revisions

Revision as of 04:12, 9 November 2010

Definition

As a subset of Euclidean space

The unit $n$ -sphere $S^{n}$ is defined as the subset of Euclidean space $R^{n + 1}$ comprising those points whose distance from the origin is $1$ .

$S^{n} = {(x_{0}, x_{1}, \dots, x_{n}) ∣ x_{0}^{2} + x_{1}^{2} + \dots + x_{n}^{2} = 1}$

Particular cases

$n$	sphere $S^{n}$
0	$S^{0}$ -- discrete two-point space
1	circle
2	2-sphere
3	3-sphere

Equivalent spaces

Space	How strongly is it equivalent to the circle?
boundary of the $(n + 1)$ -hypercube	homeomorphic; not diffeomorphic because of sharp edges
boundary of the $(n + 1)$ -simplex	homeomorphic; not diffeomorphic because of sharp edges
ellipsoid in $R^{n + 1}$	equivalent via affine transformation

Algebraic topology

Homology groups

With coefficients in $Z$ , the $n$ -sphere $S^{n}$ has $H_{0} (S^{n}) ≅ H_{n} (S^{n}) ≅ Z$ and $H_{k} (S^{n}) = 0$ for $k \notin {0, n}$ . In particular, the $n$ -sphere is $(n - 1)$ -connected.

Interpretations in terms of various homology theories:

Fill this in later

With coefficients in any $R$ -module $M$ for a ring $R$ , the $n$ -sphere $S^{n}$ has $H_{n} (S^{n}) = M$ and $H_{k} (S^{n}) = 0$ for all $k \neq n$ .

Cohomology groups and cohomology ring

With coefficients in $Z$ , the $n$ -sphere $S^{n}$ has $H^{0} (S^{n}) ≅ H^{n} (S^{n}) ≅ Z$ and $H^{k} (S^{n}) = 0$ for $k \notin {0, n}$ . In particular, the $n$ -sphere is $(n - 1)$ -connected.

With coefficients in any $R$ -module $M$ for a ring $R$ , the $n$ -sphere $S^{n}$ has $H^{n} (S^{n}) = M$ and $H^{k} (S^{n}) = 0$ for all $k \neq n$ .

The cohomology ring is isomorphic to $Z [x] / (x^{2})$ , where $x$ is a generator of the <amth>n^{th}</math> cohomology.

Homotopy groups

Further information: n-sphere is (n-1)-connected

For $k < n$ , the homotopy group $π_{k} (S^{n})$ is the trivial group. $π_{n} (S^{n}) ≅ Z$ , with the identity map $S^{n} \to S^{n}$ being a generator.

The cases $k > n$ are discussed below:

Case	What can we say?
$n = 1$	$π_{k} (S^{n})$ is trivial for all $k > 1$
$k = 2 n - 1$	$π_{k} (S^{n}) ≅ Z$
$k > n, k \neq 2 n - 1$	$π_{k} (S^{n})$ is a finite abelian group

@@ Line 52: / Line 52: @@
 The cohomology ring is isomorphic to <math>\mathbb{Z}[x]/(x^2)</math>, where <math>x</math> is a generator of the <amth>n^{th}</math> cohomology.
+===Homotopy groups===
+{{further|[[n-sphere is (n-1)-connected]]}}
+For <math>k < n</math>, the homotopy group <math>\pi_k(S^n)</math> is the [[trivial group]]. <math>\pi_n(S^n) \cong \mathbb{Z}</math>, with the identity map <math>S^n \to S^n</math> being a generator.
+The cases <math>k > n</math> are discussed below:
+{| class="sortable" border="1"
+! Case !! What can we say?
+|-
+| <math>n = 1</math> || <math>\pi_k(S^n)</math> is trivial for all <math>k > 1</math>
+|-
+| <math>k = 2n - 1</math> || <math>\pi_k(S^n) \cong \mathbb{Z}</math>
+|-
+| <math>k > n, k \ne 2n - 1</math> || <math>\pi_k(S^n)</math> is a [[finite abelian group]]
+|}