Nonzero star products*
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Publication:3478552
DOI10.1080/03081089008817992zbMath0701.15026OpenAlexW1969195614MaRDI QIDQ3478552
J. A. Dias da Silva, Amélia Fonseca
Publication date: 1990
Published in: Linear and Multilinear Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03081089008817992
symmetric groupsymmetry classes of tensorstensor productstar productsymmetrizerirreducible (complex) characters
Related Items (16)
Symmetrized Tensors and Spherical Functions ⋮ The covering number of the elements of a matroid and generalized matrix functions ⋮ Multilinearity partitions of characters of embedded groups* ⋮ New conditions for equality of decomposable symmetrized tensors ⋮ Symmetry classes of tensors:dual indices ⋮ Induced operators on symmetry classes of tensors ⋮ Rank Partitions under Small Perturbations ⋮ Operator properties of \(T\) and \(K(T)\) ⋮ Small perturbations and pairs of matrices that have the same immanent ⋮ Variation of induced linear operators ⋮ Conditions for a symmetrized tensor associated with a spherical function to be zero ⋮ The multilinear algebra of José Dias da Silva and the Portuguese school of mathematics ⋮ On a permutation character ofSm ⋮ Orthogonal decomposable symmetrized tensors ⋮ Indices and nonzero decomposable elements of a symmetry class of tensors ⋮ Row and column rank partitions under small perturbations
Cites Work
- Conditions for a symmetrized decomposable tensor to be zero
- Elementary divisors of induced transformations on symmetry classes of tensors
- Nonzero decomposable symmetrized tensors
- The index of a symmetry class of tensors
- On the μ-colorings of a matroid
- On the multilinearity partition of an irreducible character
- Unnamed Item
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