Add to ORKGsummary:We deduce that for $n\ge 2$ and $r\ge 1$, every natural affinor on $J^rT$ over $n$-manifolds is of the form $\lambda \delta $ for a real number $\lambda $, where $\delta $ is the identity affinor on $J^rT$
summary:The author proves that for a manifold $M$ of dimension greater than 2 the sets of all natura...
summary:For natural numbers $r$ and $n$ and a real number $a$ we construct a natural vector bundle $...
If \(m \geq 3\) and \(r \geq 1\), we prove that any natural linear operator \(A\) lifting 2-vector f...
summary:We deduce that for $n\ge 2$ and $r\ge 1$, every natural affinor on $J^rT$ over $n$-manifolds...
summary:For natural numbers $r$ and $n\ge 2$ a complete classification of natural affinors on the na...
If m≥3 and r≥0, we deduce that any natural linear operator lifting vector fields from an m-manifold ...
summary:For natural numbers $r\ge 2$ and $n$ a complete classification of natural transformations $A...
summary:For natural numbers $r$ and $n\geq 2$ all natural operators $T_{\vert \Cal M f_n}\rightsquig...
summary:All natural affinors on the $r$-th order cotangent bundle $T^{r*}M$ are determined. Basic af...
summary:A classification of natural transformations transforming vector fields on $n$-manifolds into...
summary:The authors prove that all natural affinors (i.e. tensor fields of type (1,1) on the extende...
summary:The author studies the problem how a map $L:M\to\bbfR$ on an $n$-dimensional manifold $M$ ca...
summary:[For the entire collection see Zbl 0699.00032.] \par In this interesting paper the authors s...
summary:Let $F$ be a $p$-dimensional foliation on an $n$-manifold $M$, and $T^r M$ the $r$-tangent b...
summary:Let $r,n$ be fixed natural numbers. We prove that for $n$-manifolds the set of all linear na...
summary:The author proves that for a manifold $M$ of dimension greater than 2 the sets of all natura...
summary:For natural numbers $r$ and $n$ and a real number $a$ we construct a natural vector bundle $...
If \(m \geq 3\) and \(r \geq 1\), we prove that any natural linear operator \(A\) lifting 2-vector f...
summary:We deduce that for $n\ge 2$ and $r\ge 1$, every natural affinor on $J^rT$ over $n$-manifolds...
summary:For natural numbers $r$ and $n\ge 2$ a complete classification of natural affinors on the na...
If m≥3 and r≥0, we deduce that any natural linear operator lifting vector fields from an m-manifold ...
summary:For natural numbers $r\ge 2$ and $n$ a complete classification of natural transformations $A...
summary:For natural numbers $r$ and $n\geq 2$ all natural operators $T_{\vert \Cal M f_n}\rightsquig...
summary:All natural affinors on the $r$-th order cotangent bundle $T^{r*}M$ are determined. Basic af...
summary:A classification of natural transformations transforming vector fields on $n$-manifolds into...
summary:The authors prove that all natural affinors (i.e. tensor fields of type (1,1) on the extende...
summary:The author studies the problem how a map $L:M\to\bbfR$ on an $n$-dimensional manifold $M$ ca...
summary:[For the entire collection see Zbl 0699.00032.] \par In this interesting paper the authors s...
summary:Let $F$ be a $p$-dimensional foliation on an $n$-manifold $M$, and $T^r M$ the $r$-tangent b...
summary:Let $r,n$ be fixed natural numbers. We prove that for $n$-manifolds the set of all linear na...
summary:The author proves that for a manifold $M$ of dimension greater than 2 the sets of all natura...
summary:For natural numbers $r$ and $n$ and a real number $a$ we construct a natural vector bundle $...
If \(m \geq 3\) and \(r \geq 1\), we prove that any natural linear operator \(A\) lifting 2-vector f...