Given a complex submanifold $M $ of the projective space $ mathbb P(T)$,the hyperplane system $R$ on $M$ characterizes the projective embedding of $M$ into $mathbb P(T)$ in the following sense: for any two nondegenerate complex submanifolds $M subset mathbb P(T)$ and $M 'subset mathbb P(T')$, there is a projective linear transformation that sends an open subset of $M$ onto an open subset of $M'$ if and only if $(M, R)$ is locally equivalent to $(M', R')$. Se-ashi developed a theory for the differential invariants of these types of systems of linear differential equations. In particular, the theory applies to systems of linear differential equations that have symbols equivalent to the hyperplane systems on nondegenerate equivariant embeddings of compact Hermitian symmetric spaces. In this paper, we extend this result to hyperplane systems on nondegenerate equivariant embeddings of homogeneous spaces of the first kind.
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机译:给定投影空间$ mathbb P(T)$的复杂子流形$ M $,$ M $上的超平面系统$ R $表征了$ M $在$ mathbb P(T)$中的投影嵌入含义:对于任何两个非退化的复杂子流形$ M subset mathbb P(T)$和$ M' subset mathbb P(T')$,存在射影线性变换,该变换将$ M $的一个开放子集发送到当且仅当$(M,R)$在本地等效于$(M',R')$时,才开放$ M'$的开放子集。 Se-ashi为这些类型的线性微分方程组的微分不变量开发了一种理论。尤其是,该理论适用于线性微分方程组,该方程组的符号等效于紧凑Hermitian对称空间的非退化等变嵌入上的超平面系统。在本文中,我们将此结果扩展到第一类齐次空间的非退化等变嵌入上的超平面系统。
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