Difference between revisions of "Homotopic paths"
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Revision as of 19:34, 16 April 2015
Definition
Note: by default always assume a homotopy is endpoint preserving!
Given two paths in a topological space [ilmath]p_0[/ilmath] and [ilmath]p_1[/ilmath]
Then we may say they are homotopic[1] if there exists a continuous map:
- [math]H:[0,1]\times[0,1]\rightarrow X[/math] such that
- [math]\forall t\in[0,1][/math] we have
- [math]H(t,0)=p_0(t)[/math] and
- [math]H(t,1)=p_1(t)[/math]
- [math]\forall t\in[0,1][/math] we have
End point preserving homotopy
[ilmath]H[/ilmath] is an end point preserving homotopy if in addition to the above we also have
- [math]\forall u\in[0,1]\ H(t,u)[/math] is a path from [ilmath]x_0[/ilmath] to [ilmath]x_1[/ilmath]
That is to say a homotopy where:
- [ilmath]p_0(0)=p_1(0)=x_0[/ilmath] and
- [ilmath]p_0(1)=p_1(1)=x_1[/ilmath]
Purpose
A homotopy is a continuous deformation from [ilmath]p_0[/ilmath] to [ilmath]p_1[/ilmath]
See also
References
- ↑ Introduction to topology - lecture notes nov 2013 - David Mond
