Loop (topology)

In mathematics, a loop in a topological space $X$ is a continuous function $f$ from the unit interval $I = [0,1]$ to $X$ such that $f (0) = f (1)$ . In other words, it is a path whose initial point is equal to its terminal point.^[1]

A loop may also be seen as a continuous map $f$ from the pointed unit circle $S 1$ into $X$ , because $S 1$ may be regarded as a quotient of $I$ under the identification of 0 with 1.

The set of all loops in $X$ forms a space called the loop space of $X$ .^[1]

Definition

Let $X$ be a topological space. A loop is a continuous function $f:[0,1]\to X$ such that $f(0)=f(1)$ . If $f$ begins and ends at $x_{0}\in X$ the loop is said to be based at $x_{0}$ . A loop is then a path that begins and ends at the same point $x_{0}$ .^[2]

The set of homotopy classes of loops based at $x_{0}$ together with the operation of path composition, forms the fundamental group of $X$ relative to $x_{0}$ , usually denoted by $\pi _{1}(X,x_{0})$ .^[2]

References

^ ^a ^b Adams, John Frank (1978), Infinite Loop Spaces, Annals of mathematics studies, vol. 90, Princeton University Press, p. 3, ISBN 9780691082066.
^ ^a ^b Munkres, James Raymond (2014). Topology (2 ed.). Harlow: Pearson. p. 331. ISBN 978-1-292-02362-5.

[ils-1] Adams, John Frank (1978), Infinite Loop Spaces, Annals of mathematics studies, vol. 90, Princeton University Press, p. 3, ISBN 9780691082066.

[munkres-2] Munkres, James Raymond (2014). Topology (2 ed.). Harlow: Pearson. p. 331. ISBN 978-1-292-02362-5.

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Definition

See also

References