Bundle functors with the point property which admit prolongation of connections
Tom 97 / 2010
Annales Polonici Mathematici 97 (2010), 253-256
MSC: Primary 58A20.
DOI: 10.4064/ap97-3-4
Streszczenie
Let $F:\mathcal M f\to\mathcal F\cal M$ be a bundle functor with the point property $F(pt)=pt$, where $pt$ is a one-point manifold. We prove that $F$ is product preserving if and only if for any $m$ and $n$ there is an $\cal F\cal M_{m,n}$-canonical construction $D$ of general connections $D({\mit\Gamma})$ on $Fp:FY\to FM$ from general connections $\mit\Gamma$ on fibred manifolds $p:Y\to M$.
