Siegel parabolic subgroup: Difference between revisions
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In [[mathematics]], the '''Siegel parabolic subgroup''', named after [[Carl Ludwig Siegel]], is the [[Borel subgroup|parabolic subgroup]] of the [[symplectic group]] with abelian radical, given by the matrices of the symplectic group whose lower left quadrant is 0 (for the standard symplectic form). |
In [[mathematics]], the '''Siegel parabolic subgroup''', named after [[Carl Ludwig Siegel]], is the [[Borel subgroup|parabolic subgroup]] of the [[symplectic group]] with abelian radical, given by the matrices of the symplectic group whose lower left quadrant is 0 (for the standard symplectic form). |
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[[Category:Automorphic forms]] |
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[[Category:Algebraic groups]] |
[[Category:Algebraic groups]] |
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{{Math-stub}} |
Latest revision as of 00:46, 28 April 2024
In mathematics, the Siegel parabolic subgroup, named after Carl Ludwig Siegel, is the parabolic subgroup of the symplectic group with abelian radical, given by the matrices of the symplectic group whose lower left quadrant is 0 (for the standard symplectic form).
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