Add to ORKGsummary:In this paper the symmetric differential and symmetric Lie derivative are introduced. Using these tools derivations of the algebra of symmetric tensors are classified. We also define a Frölicher-Nijenhuis bracket for vector valued symmetric tensors
The tensor theory is a branch of Multilinear Algebra that describes the relationship between sets of...
A detailed account of main results in the theory of differential tensor algebras
In this note, we discuss symmetric brackets on skew-symmetric algebroids associated with metric or s...
Abstract. In this paper the symmetric differential and symmetric Lie deriv-ative are introduced. Usi...
summary:In this paper the symmetric differential and symmetric Lie derivative are introduced. Using ...
We define covariant Lie derivatives acting on vector-valued forms on Lie algebroids and study their ...
Let L be a finite-dimensional Lie algebra over an algebraically closed field of characteristic zero ...
AbstractWe suggest a different point of view on some aspects of classical invariant theory. A tensor...
<正> In this paper any symmetric tensor is decomposed into the sum of two tensors. One of them ...
This Master's thesis clarifies the significance of Frölicher-Nijenhuis bracket and its applications ...
International audienceA symmetric tensor is a higher order generalization of a symmetric matrix. In ...
This paper essentially deals with the classification of a symmetric tensor on a four‐dimensional Lor...
We generalize the classical isomorphism between symmetric functions and invariants of a matrix. In p...
A tensor is a multi-dimensional data array, occurring ubiquitously in mathematics, physics, engineer...
Killing–Yano tensors are natural generalizations of Killing vectors. We investigate whether Killing–...
The tensor theory is a branch of Multilinear Algebra that describes the relationship between sets of...
A detailed account of main results in the theory of differential tensor algebras
In this note, we discuss symmetric brackets on skew-symmetric algebroids associated with metric or s...
Abstract. In this paper the symmetric differential and symmetric Lie deriv-ative are introduced. Usi...
summary:In this paper the symmetric differential and symmetric Lie derivative are introduced. Using ...
We define covariant Lie derivatives acting on vector-valued forms on Lie algebroids and study their ...
Let L be a finite-dimensional Lie algebra over an algebraically closed field of characteristic zero ...
AbstractWe suggest a different point of view on some aspects of classical invariant theory. A tensor...
<正> In this paper any symmetric tensor is decomposed into the sum of two tensors. One of them ...
This Master's thesis clarifies the significance of Frölicher-Nijenhuis bracket and its applications ...
International audienceA symmetric tensor is a higher order generalization of a symmetric matrix. In ...
This paper essentially deals with the classification of a symmetric tensor on a four‐dimensional Lor...
We generalize the classical isomorphism between symmetric functions and invariants of a matrix. In p...
A tensor is a multi-dimensional data array, occurring ubiquitously in mathematics, physics, engineer...
Killing–Yano tensors are natural generalizations of Killing vectors. We investigate whether Killing–...
The tensor theory is a branch of Multilinear Algebra that describes the relationship between sets of...
A detailed account of main results in the theory of differential tensor algebras
In this note, we discuss symmetric brackets on skew-symmetric algebroids associated with metric or s...