On Kostant's theorem for the Lie superalgebra \(Q(n)\)
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Publication:304091
DOI10.1016/j.aim.2016.03.021zbMath1402.17022arXiv1403.3866OpenAlexW1853025049MaRDI QIDQ304091
Elena Poletaeva, Vera V. Serganova
Publication date: 23 August 2016
Published in: Advances in Mathematics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1403.3866
Related Items (16)
On Finite W-Algebras for Lie Superalgebras in Non-Regular Case ⋮ Quantum Berezinian for a strange Lie superalgebra ⋮ Representations of principal \(W\)-algebra for the superalgebra \(Q(n)\) and the super Yangian \textit{YQ}(1) ⋮ On linked modules over the super-Yangian of the superalgebra Q(1) ⋮ On the finite W-algebra for the Lie superalgebra Q(N) in the non-regular case ⋮ On finite-dimensional representations of finite \(W\)-superalgebras ⋮ On 1-dimensional modules over the super-Yangian of the superalgebra \(Q(1)\) ⋮ The Drinfeld Yangian of the queer Lie superalgebra. Defining relations ⋮ Classical affine W-superalgebras via generalized Drinfeld-Sokolov reductions and related integrable systems ⋮ Finite \(W\)-superalgebras via super Yangians ⋮ Minimal \(W\)-superalgebras and the modular representations of basic Lie superalgebras ⋮ Classical affine W-algebras associated to Lie superalgebras ⋮ Super formal Darboux-Weinstein theorem and finite \(W\)-superalgebras ⋮ On principal finite W-algebras for the Lie superalgebra D(2, 1; α) ⋮ On Principal Finite W-Algebras for Certain Orthosymplectic Lie Superalgebras and F(4) ⋮ Finite \(W\)-superalgebras for basic Lie superalgebras
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