Cone space: Difference between revisions

Revision as of 23:28, 9 October 2010

This article describes a construct that involves some variant of taking a product of a topological space with the unit interval and then making some identifications, typically at the endpoints, based on some specific maps.
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Definition

Given a topological space $X$ , the cone space of $X$ , denoted as $CX$ , is defined as the quotient of $X\times I$ by the equivalence relation:

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

Here, $I$ refers to the unit interval.

Refer:

Cone space functor to see the properties of the cone space functor
Cone-realizable space to see the property of a topological space being realizable as the cone space over some space

@@ Line 6: / Line 6: @@
 <math>(x_1,0) \sim (x_2,0) \forall x_1,x_2 \in X</math>
+Here, <math>I</math> refers to the [[unit interval]].
 Refer: