Dotted topological space
A pointed space is a pair ( X , x 0 ), consisting of a topological space X and a point x 0 in X ( ground point , basic point , excellent spot ). A dotted (continuous) map ( X , x 0 ) → ( Y , y 0 ) is a continuous map X → Y , which maps x 0 to y 0 .
Often the base point is simply designated with an asterisk.
If the inclusion is a cofiber , one speaks of a well-dotted space.
A topological space is called homogeneous if two dotted topological spaces are isomorphic on it.
Categorical properties
The category of dotted topological spaces is isomorphic to the comma category . It has zero objects (those spaces which only consist of one point). Products are the usual products of topological spaces, coproducts are one-point unions , i.e. disjoint unions in which the respective marked points are identified with each other, written .
Homotopy classes of dotted maps
Two dotted figures
hot homotopic if there is a continuous map with
![H \ colon X \ times \ left [0,1 \ right] \ to Y](https://wikimedia.org/api/rest_v1/media/math/render/svg/48afd513813e0305e9f63e3f0bb2138edaa35a01)
![H (x_ {0}, t) = y_ {0} \ \ forall t \ in \ left [0,1 \ right]](https://wikimedia.org/api/rest_v1/media/math/render/svg/8a00881e66f4cbf2b421bc18065ffa7f87f33fa8)
gives. The set of homotopy classes of dotted maps is denoted by.
![\ left [X, Y \ right]](https://wikimedia.org/api/rest_v1/media/math/render/svg/ec156cb9ce0e02cf471b32b77dadfa62679adb95)
Individual evidence
- ↑ Jon P. May: A Concise Course in Algebraic Topology. University of Chicago Press, Chicago IL et al. 1999, ISBN 0-226-51183-9 , section 8.3.