Questions tagged [principal-bundles]

In mathematics, a principal bundle is a mathematical object which formalizes some of the essential features of the Cartesian product $X\times G$ of a space $X$ with a group $G$.

In mathematics, a principal bundle is a mathematical object which formalizes some of the essential features of the Cartesian product $X\times G$ of a space $X$ with a group $G$. In the same way as with the Cartesian product, a principal bundle $P$ is equipped with

  1. An action of $G$ on $P$, analogous to $(x,g)h = (x, gh)$ for a product space.
  2. A projection onto $X$. For a product space, this is just the projection onto the first factor, $(x,g) \to x$.

Unlike a product space, principal bundles lack a preferred choice of identity cross-section; they have no preferred analog of $(x,e)$. Likewise, there is not generally a projection onto $G$ generalizing the projection onto the second factor, $X \times G \to G$ which exists for the Cartesian product. They may also have a complicated topology, which prevents them from being realized as a product space even if a number of arbitrary choices are made to try to define such a structure by defining it on smaller pieces of the space (Wikipedia).

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Reduction of the structure group

I'm studying the $H$-structures on principal bundles, here is the definition: Let $p:E\rightarrow B$ be a principal $G$-bundle and let $H
Filippo
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Chern-Weil classification

I've come to a non-sense, and I would need some help to understand where I'm doing a mistake. I'm currently studying the Chern-Weil homomorphism which allows a classification of the principal $G$-bundles for a given $G$. For recall: For a a…
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Question concerning the relation between the reduction of a $G$-principal bundle to some subgroup $H$ of $G$ and Čech cocycles.

Let $G$ be a Lie group and $M$ be a smooth manifold. I have to show that a $G$-principal bundle admits a reduction to some subgroup $H$ of $G$ if and only if there exists a Čech cocycle $\{(U_{\alpha})_{\alpha \in I}, \psi_{\alpha\beta} :…
Crystal
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Momentum space from principal bundle

I wish to consider a principal bundle which has a fibre $F$ of spatial $d$-dimensional momenta over a base manifold of $\mathbb{R}$. So, naturally the momenta $k^i$ is the generator of the structure group which is the group of translations with the…
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Doubt on associated bundles

Quick question:-Sometimes when you have a principal $G$-bundle $p:P\rightarrow B$ and another topological space $F$ upon which $G$ acts, it's said that one can define the associated bundle $P\times_{B}F$, but what does that mean when you have the…
Filippo
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Smoothness of the associated G-valued map of a bundle automorphism of a principal G-bundle

Let $\pi: P\rightarrow M$ be a principal $G$-bundle and $f:P\to P$ be a bundle automorphism. Define $\sigma_f: P\to G$ by $f(p)=p\cdot \sigma_f(p)$. It is claimed that $ \sigma_f$ is a G-valued map, i.e. a smooth map and $\sigma_f(p\cdot…
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fiber bundles associated to a principal bundle

in the definition of a fiber bundle associated to a principal bundle,we have this: (P*F)~ s.t. (p,f)~(p.g,g-1.f) where P is principal bundle and F is a Manifold. such way of gluing the points of P*F together gives us a quotient topological…
mja
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Equivariant maps on principal G-bundles

Let $P_1,P_2$ be $G_1,G_2$ principal bundles over a smooth manifold. Let $\alpha: G_1 \to G_2$ be a group homomorphism. A morphism of principal bundles over $\alpha$ is an $\alpha$-equivariant smooth bundle map. I want to show that for a principal…
Abellan
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