Geometry of bi-Lagrangian Grassmannian

I. K. Kozlov
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Abstract

This paper explores the structure of bi-Lagrangian Grassmanians for pencils of $2$-forms on real or complex vector spaces. We reduce the analysis to the pencils whose Jordan-Kronecker Canonical Form consists of Jordan blocks with the same eigenvalue. We demonstrate that this is equivalent to studying Lagrangian subspaces invariant under a nilpotent self-adjoint operator. We calculate the dimension of bi-Lagrangian Grassmanians and describe their open orbit under the automorphism group. We completely describe the automorphism orbits in the following three cases: for one Jordan block, for sums of equal Jordan blocks and for a sum of two distinct Jordan blocks.
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双拉格朗日格拉斯曼几何学
本文探讨了实向量空间或复向量空间上 2 美元形式铅笔的双拉格朗日格拉斯曼结构。我们将分析简化为由具有相同特征值的乔丹块组成的乔丹-克朗内克标准形式(Jordan-Kronecker Canonical Form)的铅笔。我们证明,这等同于研究在零势自相加算子作用下不变的拉格朗日子空间。我们计算了双拉格朗日格拉斯曼的维数,并描述了它们在自变形群下的开位。我们完整地描述了以下三种情况下的自形位:一个乔丹块、相等乔丹块之和以及两个不同乔丹块之和。
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