We determine all natural operators D transforming general connections Γ on fibred manifolds Y → M and torsion free classical linear connections ∇ on M into general connections D(Γ,∇) on the second order jet prolongation J2Y → M of Y → M
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Geometric constructions of connections on the higher order principal prolongations of a prin...
We describe all natural operators \(A\) transforming general connections \(\Gamma\) on fibred manifo...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
summary:We describe how find all $\mathcal Mf_m$-natural operators $D$ transforming torsion free cla...
We study how a projectable general connection \(\Gamma\) in a 2-fibred manifold \(Y^2\to Y^1\to Y^0...
summary:Given a fibered manifold $Y \to X$, a 2-connection on $Y$ means a section $J^1 Y \to J^2 Y$....
summary:Given a fibered manifold $Y \to X$, a 2-connection on $Y$ means a section $J^1 Y \to J^2 Y$....
summary:We classify all bundle functors $G$ admitting natural operators transforming connections on ...
summary:We classify all bundle functors $G$ admitting natural operators transforming connections on ...
We prove that any first order \(\mathcal{F}_2\mathcal{M}_{m_1,m_2,n_1,n_2}\)-natural operator transf...
We describe all \(\mathcal{F}^2\mathcal{M}_{m_1,m_2,n_1,n_2}\)-natural operators \(D\colon Q^{\tau}_...
Let \(F\) be a bundle functor on the category of all fibred manifolds and fibred maps. Let \(\Gamma\...
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Geometric constructions of connections on the higher order principal prolongations of a prin...
We describe all natural operators \(A\) transforming general connections \(\Gamma\) on fibred manifo...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
summary:We describe how find all $\mathcal Mf_m$-natural operators $D$ transforming torsion free cla...
We study how a projectable general connection \(\Gamma\) in a 2-fibred manifold \(Y^2\to Y^1\to Y^0...
summary:Given a fibered manifold $Y \to X$, a 2-connection on $Y$ means a section $J^1 Y \to J^2 Y$....
summary:Given a fibered manifold $Y \to X$, a 2-connection on $Y$ means a section $J^1 Y \to J^2 Y$....
summary:We classify all bundle functors $G$ admitting natural operators transforming connections on ...
summary:We classify all bundle functors $G$ admitting natural operators transforming connections on ...
We prove that any first order \(\mathcal{F}_2\mathcal{M}_{m_1,m_2,n_1,n_2}\)-natural operator transf...
We describe all \(\mathcal{F}^2\mathcal{M}_{m_1,m_2,n_1,n_2}\)-natural operators \(D\colon Q^{\tau}_...
Let \(F\) be a bundle functor on the category of all fibred manifolds and fibred maps. Let \(\Gamma\...
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Let $F=F^{(A,H,t)}$ and $F^1=F^{(A^1,H^1,t^1)}$ be fiber product preserving bundle functors ...
summary:Geometric constructions of connections on the higher order principal prolongations of a prin...
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