各向同性格拉斯曼图、plpl克图和Cartan图

F. Balogh, J. Harnad, J. Hurtubise
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引用次数: 13

摘要

这项工作的动机是KP和BKP可积层次之间的关系,其$\tau$ -函数可以看作是无限维格拉斯曼图上的对偶行列式和Pfaffian线束的部分。在有限维度中,我们展示了如何将Cartan映射(对于维度为$N$的向量空间$V$,将$V+ V^*$的最大各向同性子空间的Grassmannian ${\mathrm {Gr}}^0_V(V+V^*)$关于自然标量积嵌入到外部空间$\Lambda(V)$的投影中)与Plucker映射联系起来,它将$V+ V^*$中所有$N$ -平面的格拉斯曼式${\mathrm {Gr}}_V(V+ V^*)$嵌入到$\Lambda^N(V + V^*)$的投影中。${\mathrm {Gr}}^0_V(V+V^*)$上的Plucker坐标用Cartan坐标双线性表示,Cartan坐标是对偶Pfaffian线束${\mathrm {Pf}}^* \rightarrow {\mathrm {Gr}}^0_V(V+V^*, Q)$的全纯截面。就大单元格上的仿射坐标而言,这相当于柯西-比奈型恒等式,将偏对称$N \times N$矩阵的方子矩阵的行列式表示为其主副矩阵的双线性和。
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Isotropic Grassmannians, Plücker and Cartan maps
This work is motivated by the relation between the KP and BKP integrable hierarchies, whose $\tau$-functions may be viewed as sections of dual determinantal and Pfaffian line bundles over infinite dimensional Grassmannians. In finite dimensions, we show how to relate the Cartan map which, for a vector space $V$ of dimension $N$, embeds the Grassmannian ${\mathrm {Gr}}^0_V(V+V^*)$ of maximal isotropic subspaces of $V+ V^*$, with respect to the natural scalar product, into the projectivization of the exterior space $\Lambda(V)$, and the Plucker map, which embeds the Grassmannian ${\mathrm {Gr}}_V(V+ V^*)$ of all $N$-planes in $V+ V^*$ into the projectivization of $\Lambda^N(V + V^*)$. The Plucker coordinates on ${\mathrm {Gr}}^0_V(V+V^*)$ are expressed bilinearly in terms of the Cartan coordinates, which are holomorphic sections of the dual Pfaffian line bundle ${\mathrm {Pf}}^* \rightarrow {\mathrm {Gr}}^0_V(V+V^*, Q)$. In terms of affine coordinates on the big cell, this is equivalent to an identity of Cauchy-Binet type, expressing the determinants of square submatrices of a skew symmetric $N \times N$ matrix as bilinear sums over the Pfaffians of their principal minors.
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