A \(v\)-analogue of Peel's theorem
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Publication:2386034
DOI10.1016/j.jalgebra.2004.04.017zbMath1066.05146OpenAlexW1989474216MaRDI QIDQ2386034
Hyohe Miyachi, Joseph Chuang, Kai Meng Tan
Publication date: 22 August 2005
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jalgebra.2004.04.017
Related Items (5)
\(q\)-analogues of regularisation theorems for linear and projective representations of the symmetric group. ⋮ Specht modules labelled by hook bipartitions. I ⋮ Decomposable Specht modules indexed by bihooks ⋮ Some Results for Decomposition Numbers for the Hecke Algebra of Type A withq = −1 ⋮ Kronecker positivity and 2-modular representation theory
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- Q-analogues of Clifford and Weyl algebras - spinor and oscillator representations of quantum enveloping algebras
- On crystal bases of the \(q\)-analogue of universal enveloping algebras
- On the decomposition numbers of the Hecke algebra of \(G(m,1,n)\)
- Hecke algebras of type \(A\) with \(q=-1\)
- Hecke algebras at roots of unity and crystal bases of quantum affine algebras
- On the decomposition matrices of the quantized Schur algebra
- Crystal base for the basic representation of \(U_ q({\mathfrak sl}^\wedge (n))\)
- The Decomposition Matrices of GL n (q ) for n ⩽ 10
- Hook representations of the symmetric groups
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