Change of fiber: Difference between revisions

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Given a fibration p:E→B, the change of fiber is a map between the fibers induced by paths in B.

Since a covering is a fibration, the construction generalizes the corresponding facts in the theory of covering spaces.

Definition

If β is a path in B, then we have the homotopy $h:p^{-1}(b)\times I\to I{\overset {\beta }{\to }}B$ where the first map is a projection. Since p is a fibration, by the homotopy lifting property, h lifts to a homotopy $g:p^{-1}(b)\times I\to E$ with $g_{0}:p^{-1}(b)\hookrightarrow E$ . We have:

g_{t}:p^{-1}(b)\to p^{-1}(\beta (t))

.

We let $\tau (\beta )=g_{1}$ . Let $\operatorname {Pc} (B)$ denotes the set of path classes in B. We claim that the τ we have just constructed induces:

\tau :\operatorname {Pc} (B)\to

the set of homotopy classes of maps.

It is immediate from the construction that the map is a homomorphism:

\tau ([\beta ]\cdot [\gamma ])=\tau ([\beta ])\tau ([\gamma ])

.

Consequence

One can get a substitute for a structure group.

This topology-related article is a stub. You can help Wikipedia by expanding it.

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 == Definition ==
-If ''β'' is a path in ''B'', then we have the homotopy <math>h: p^{-1}(b) \times I \to I \overset{\beta}\to B</math> where the first map is a projection. Since ''p'' is a fibration, by the [[homotopy lifting property]], ''h'' lifts to a homotopy <math>g: p^{-1}(b) \times I \to E</math> with <math>g_0: p^{-1}(b) \hookrigtarrow E</math>. We have:
+If ''β'' is a path in ''B'', then we have the homotopy <math>h: p^{-1}(b) \times I \to I \overset{\beta}\to B</math> where the first map is a projection. Since ''p'' is a fibration, by the [[homotopy lifting property]], ''h'' lifts to a homotopy <math>g: p^{-1}(b) \times I \to E</math> with <math>g_0: p^{-1}(b) \hookrightarrow E</math>. We have:
 :<math>g_t: p^{-1}(b) \to p^{-1}(\beta(t))</math>.
 We let <math>\tau(\beta) = g_1</math>. Let <math>\operatorname{Pc}(B)</math> denotes the set of path classes in ''B''. We claim that the τ we have just constructed induces:
-:<math>\tau: \operatorname{Pc}(B) \to </math> the set of homotopy classes of maps in ''
+:<math>\tau: \operatorname{Pc}(B) \to </math> the set of homotopy classes of maps.
 It is immediate from the construction that the map is a homomorphism:
 :<math>\tau([\beta] \cdot [\gamma]) = \tau([\beta]) \tau([\gamma])</math>.