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Suspension functor

From Topospaces

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Template:Self-functor on topospaces

Definition

The suspension functor $S$ is a functor from the category of topological spaces with continuous maps to itself, defined as follows:

It sends each topological space $X$ to its suspension $S X$
Given a continuous map $f : X \to Y$ , the induced map $S f : S X \to S Y$ is the map naturally induced by quotienting out from the map $X \times I \to Y \times I$ given by $f \times i d$ .

Iteration

The iteration of the suspension functor $n$ times is equivalent to taking the join with a $(n - 1)$ -sphere.

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