Combinatorics, transvectants and superalgebras. An elementary constructive approach to Hilbert's finiteness theorem
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Publication:863317
DOI10.1016/j.aam.2005.06.008zbMath1107.05099OpenAlexW2083823079MaRDI QIDQ863317
Andrea Brini, Francesco Regonati, Antonio G. B. Teolis
Publication date: 26 January 2007
Published in: Advances in Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.aam.2005.06.008
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Related Items (4)
Orthogonal polynomials through the invariant theory of binary forms ⋮ Covariant algebra of the binary nonic and the binary decimic ⋮ On natural invariants and equivalence of differential operators ⋮ About Gordan's algorithm for binary forms
Cites Work
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- The theory of Lie superalgebras. An introduction
- Graph theory and classical invariant theory
- Gordan ideals in the theory of binary forms
- Algebraic homogeneous spaces and invariant theory
- Computational invariant theory
- Hook Young diagrams with applications to combinatorics and to representations of Lie superalgebras
- The work of Gian-Carlo Rota on invariant theory
- Polynomial bounds for rings of invariants
- Gordan—Capelli series in superalgebras
- Young—Capelli symmetrizers in superalgebras
- On the Foundations of Combinatorial Theory: IX Combinatorial Methods in Invariant Theory
- Observable Groups and Hilbert's Fourteenth Problem
- Combinatorics and Representation Theory of Lie Superalgebras over Letterplace Superalgebras
- Algorithms in invariant theory
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