A universal mirror to $(\mathbb{P}^2, Ω)$ as a birational object

Ailsa Keating, Abigail Ward
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Abstract

We study homological mirror symmetry for $(\mathbb{P}^2, \Omega)$ viewed as an object of birational geometry, with $\Omega$ the standard meromorphic volume form. First, we construct universal objects on the two sides of mirror symmetry, focusing on the exact symplectic setting: a smooth complex scheme $U_\mathrm{univ}$ and a Weinstein manifold $M_\mathrm{univ}$, both of infinite type; and we prove homological mirror symmetry for them. Second, we consider autoequivalences. We prove that automorphisms of $U_\mathrm{univ}$ are given by a natural discrete subgroup of $\operatorname{Bir} (\mathbb{P}^2, \pm \Omega)$; and that all of these automorphisms are mirror to symplectomorphisms of $M_\mathrm{univ}$. We conclude with some applications.
作为双向对象的$(\mathbb{P}^2, Ω)$的通用镜像
我们研究了作为双元几何对象的$(\mathbb{P}^2, \Omega)$的同调镜像对称性,其中$\Omega$是标准的子形态卷形。首先,我们构建了镜像对称两边的普遍对象,重点是精确交映设定:光滑复方案$U_\mathrm{univ}$和韦恩斯坦流形$M_\mathrm{univ}$,两者都是无穷型的;我们证明了它们的同调镜像对称性。其次,我们考虑自变等价性。我们证明$U_\mathrm{univ}$的自变量是由$operatorname{Bir} (\mathbb{P}^2, \pm \Omega)$的一个自然离散子群给出的;而且所有这些自变量都是$M_\mathrm{univ}$的交映自变量的镜像。最后,我们将介绍一些应用。
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