论格拉斯曼等变量子微分方程与 qKZ 差分方程的 Satake 对应关系

Giordano Cotti, Alexander Varchenko
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引用次数: 0

摘要

我们考虑格拉斯曼$G(k,n)$的等变量子微分方程(qDE)和qKZ差分方程的联合系统,它参数化了$\mathbb{C}^n$的k$维子空间。首先,我们建立了$G(k,n)$的联合系统与投影空间$\mathbb{P}^{n-1}$的相应系统之间的联系。具体地说,我们证明在$G(k,n)$和$mathbb{P}^{n-1}$的等变同调的合适的(textit{Satake identifications})条件下,$G(k,n)$的联合系统与$mathbb{P}^{n-1}$同调的$k$外部幂上的微分差分系统是等价的。其次,我们证明了arXiv:1909.06582和arXiv:2203.03039中阐述的格拉斯曼的(textcyr{B}定理)与 "佐竹识别 "是相容的。这意味着通过 Satake 识别,$mathbb{P}^{n-1}$ 的 \textcyr{B}-theorem 可以扩展到 $G(k,n)$。因此,我们推导出了$G(k,n)$的qDE和qKZ联合系统的多维超几何解的行列式公式和新的积分表示。最后,我们分析了与 $G(k,n)$ 相关的 qDE 和 qKZ 联合方程组的斯托克斯现象。此外,我们还证明斯托克斯矩阵等于关于这些特殊的 $K$ 理论基的等变欧拉-平卡/'e-格罗thendieck 对的格兰矩阵。
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On the Satake correspondence for the equivariant quantum differential equations and qKZ difference equations of Grassmannians
We consider the joint system of equivariant quantum differential equations (qDE) and qKZ difference equations for the Grassmannian $G(k,n)$, which parametrizes $k$-dimensional subspaces of $\mathbb{C}^n$. First, we establish a connection between this joint system for $G(k,n)$ and the corresponding system for the projective space $\mathbb{P}^{n-1}$. Specifically, we show that, under suitable \textit{Satake identifications} of the equivariant cohomologies of $G(k,n)$ and $\mathbb{P}^{n-1}$, the joint system for $G(k,n)$ is gauge equivalent to a differential-difference system on the $k$-th exterior power of the cohomology of $\mathbb{P}^{n-1}$. Secondly, we demonstrate that the \textcyr{B}-theorem for Grassmannians, as stated in arXiv:1909.06582, arXiv:2203.03039, is compatible with the Satake identification. This implies that the \textcyr{B}-theorem for $\mathbb{P}^{n-1}$ extends to $G(k,n)$ through the Satake identification. As a consequence, we derive determinantal formulas and new integral representations for multi-dimensional hypergeometric solutions of the joint qDE and qKZ system for $G(k,n)$. Finally, we analyze the Stokes phenomenon for the joint system of qDE and qKZ equations associated with $G(k,n)$. We prove that the Stokes bases of solutions correspond to explicit $K$-theoretical classes of full exceptional collections in the derived category of equivariant coherent sheaves on $G(k,n)$. Furthermore, we show that the Stokes matrices equal the Gram matrices of the equivariant Euler-Poincar\'e-Grothendieck pairing with respect to these exceptional $K$-theoretical bases.
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