G-fibration

In algebraic topology, a G-fibration or principal fibration is a generalization of a principal G-bundle, just as a fibration is a generalization of a fiber bundle. By definition,^[1] given a topological monoid G, a G-fibration is a fibration p: P→B together with a continuous right monoid action P × G → P such that

(1) $p(xg)=p(x)$ for all x in P and g in G.
(2) For each x in P, the map $G\to p^{-1}(p(x)),g\mapsto xg$ is a weak equivalence.

A principal G-bundle is a prototypical example of a G-fibration. Another example is Moore's path space fibration: namely, let $P'X$ be the space of paths of various length in a based space X. Then the fibration $p:P'X\to X$ that sends each path to its end-point is a G-fibration with G the space of loops of various lengths in X.

References

↑ "Handbook of Algebraic Topology". Books.google.co.jp. 1995-07-18. p. 833. Retrieved 2016-01-02.

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