Path Space (Algebraic Topology)

From Handwiki

In algebraic topology, a branch of mathematics, the path space PX of a based space (X,*) is the space that consists of all maps f from the interval I=[0,1] to X such that f(0)=*, called paths.[1] In other words, it is the mapping space from (I,0) to (X,*). The space XI of all maps from I to X (free paths or just paths) is called the free path space of X.[2] The path space PX can then be viewed as the pullback of XIX,χχ(0) along *X.[1]

The natural map PXX,χχ(1) is a fibration called the path space fibration.[3]

References

  1. 1.0 1.1 Martin Frankland, Math 527 - Homotopy Theory - Fiber sequences
  2. Davis & Kirk 2001, Definition 6.14.
  3. Davis & Kirk 2001, Theorem 6.15. 2.

Further reading




Categories: [Algebraic topology]


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