旗变体上线度的 K 理论格罗莫夫-维滕不变式

Anders S. Buch, Linda Chen, Weihong Xu
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引用次数: 0

摘要

如果度数为 $d$ 的 0 点稳定映射 $X$ 的模空间 $overline{M}_{0,0}(X,d)$ 也是旗综 $G/P'$,那么复旗综 $X = G/P$ 的 H_2(X)$中的一个同调类 $d \ 称为线度。我们证明了一个量等经典公式,即在 $X$ 上任何 $n$ 点的(等变的、K 理论的、零属的)线度格罗莫夫-维滕不变式都等于在旗综 $G/P'$ 上计算的经典交集数。我们还证明了彼得森(Peterson)比较公式的一个 $n$ 点类似公式,即这些不变式与完整旗簇 $G/B$ 的格罗莫夫-维滕不变式重合。我们的公式使得计算 $X$ 的大量子 K 理论环变得简单易行,其模数大于线度。
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K-theoretic Gromov-Witten invariants of line degrees on flag varieties
A homology class $d \in H_2(X)$ of a complex flag variety $X = G/P$ is called a line degree if the moduli space $\overline{M}_{0,0}(X,d)$ of 0-pointed stable maps to $X$ of degree $d$ is also a flag variety $G/P'$. We prove a quantum equals classical formula stating that any $n$-pointed (equivariant, K-theoretic, genus zero) Gromov-Witten invariant of line degree on $X$ is equal to a classical intersection number computed on the flag variety $G/P'$. We also prove an $n$-pointed analogue of the Peterson comparison formula stating that these invariants coincide with Gromov-Witten invariants of the variety of complete flags $G/B$. Our formulas make it straightforward to compute the big quantum K-theory ring of $X$ modulo degrees larger than line degrees.
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