Suspension: Difference between revisions

Revision as of 13:42, 22 May 2007

Definition

Given a topological space $X$ , the suspension of $X$ , denoted $S X$ , is defined as the quotient of $X \times I$ by the following two equivalence relations:

$(x_{1}, 0) \sim (x_{2}, 0)$

and

$(x_{1}, 1) \sim (x_{2}, 1)$

In other words, both ends of the cylinder are shrunk to a point.

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 Given a topological space <math>X</math>, the suspension of <math>X</math>, denoted <math>SX</math>, is defined as the quotient of <math>X \times I</math> by the following two equivalence relations:
-<math>(x_1,0) \simeq (x_2,0)</math>
+<math>(x_1,0) \sim (x_2,0)</math>
 and
-<math>(x_1,1) \simeq (x_2,1)</math>
+<math>(x_1,1) \sim (x_2,1)</math>
 In other words, both ends of the cylinder are shrunk to a point.