Add to ORKGThe paper contains a partial review on the general connection theory on differentiable fibre bundles. Particular attention is paid on (linear) connections on vector bundles
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
Vector bundles , which basic space is smooth n-dimensional space with affine connection, are explor...
AbstractThe existence of “universal connections” from which all connections on principal bundles can...
AbstractA generalised notion of connection on a fibre bundle E over a manifold M is presented. These...
A connection is a device that defines the concept of parallel transport on a bundle, that is identif...
A linear connection is associated with a nonlinear connection on a vector bundle by a linearization ...
summary:[For the entire collection see Zbl 0699.00032.] \par In a previous paper [Cas. Pestovani Mat...
summary:All natural operations transforming linear connections on the tangent bundle of a fibred man...
Connections and the space of connections on a fibred manifold are described. Three different means o...
Let \(F\) be a bundle functor on the category of all fibred manifolds and fibred maps. Let \(\Gamma\...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
The theory of affine connections is, roughly speaking, a generalization of certain concepts of paral...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
Vector bundles , which basic space is smooth n-dimensional space with affine connection, are explor...
AbstractThe existence of “universal connections” from which all connections on principal bundles can...
AbstractA generalised notion of connection on a fibre bundle E over a manifold M is presented. These...
A connection is a device that defines the concept of parallel transport on a bundle, that is identif...
A linear connection is associated with a nonlinear connection on a vector bundle by a linearization ...
summary:[For the entire collection see Zbl 0699.00032.] \par In a previous paper [Cas. Pestovani Mat...
summary:All natural operations transforming linear connections on the tangent bundle of a fibred man...
Connections and the space of connections on a fibred manifold are described. Three different means o...
Let \(F\) be a bundle functor on the category of all fibred manifolds and fibred maps. Let \(\Gamma\...
summary:Let $G$ be a bundle functor of order $(r,s,q)$, $s\geq r\leq q$, on the category $\Cal F\Cal...
The theory of affine connections is, roughly speaking, a generalization of certain concepts of paral...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
The theory of connections is central not only in pure mathematics (differential and algebraic geomet...
Vector bundles , which basic space is smooth n-dimensional space with affine connection, are explor...
AbstractThe existence of “universal connections” from which all connections on principal bundles can...