Suborbits of \(m\)-dimensional totally isotropic subspaces under finite singular classical groups
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Publication:1014471
DOI10.1016/J.LAA.2008.11.010zbMath1169.05310OpenAlexW2070413815MaRDI QIDQ1014471
Publication date: 29 April 2009
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.laa.2008.11.010
Related Items (8)
Suborbits of subspaces of type \((m,k)\) under finite singular general linear groups ⋮ A generalization of the formulas for intersection numbers of dual polar association schemes and their applications ⋮ Suborbits of a point stabilizer in the orthogonal group on the last subconstituent of orthogonal dual polar graphs ⋮ Association schemes based on the subspaces of type \((2, 1, 0)\) in singular symplectic space over finite fields ⋮ Suborbits of \((m,k)\)-isotropic subspaces under finite singular classical groups ⋮ Anzahl theorems in geometry oft-singular classical groups and their applications ⋮ Suborbits of a point-stabilizer in the unitary group on the last subconstituent of Hermitean dual polar graphs ⋮ t-Singular Linear Spaces
Cites Work
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- Association schemes based on maximal isotropic subspaces in singular classical spaces
- Association schemes based on attenuated spaces
- Orthogonal graphs of odd characteristic and their automorphisms
- Association schemes based on isotropic subspaces. I
- Symplectic graphs and their automorphisms
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