超卡勒流形族中的丰度和 SYZ 猜想

Andrey Soldatenkov, Misha Verbitsky
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引用次数: 0

摘要

让 $L$ 是超卡勒流形 $M$ 上的全形线束,$c_1(L)$ nef 且不大。SYZ猜想预言$L$是半样条。我们假定 $(M,L)$ 有一个$(M',L'')$ 变形,其中$L'$ 是半范数,从而证明这是真的。我们引入了一个版本的泰赫穆勒空间,它将$(M,L)$对等价化。我们证明了这种泰赫穆勒空间的全局托勒密定理的一个版本,并用它来推导半范数的变形不变性。
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Abundance and SYZ conjecture in families of hyperkahler manifolds
Let $L$ be a holomorphic line bundle on a hyperkahler manifold $M$, with $c_1(L)$ nef and not big. SYZ conjecture predicts that $L$ is semiample. We prove that this is true, assuming that $(M,L)$ has a deformation $(M',L')$ with $L'$ semiample. We introduce a version of the Teichmuller space that parametrizes pairs $(M,L)$ up to isotopy. We prove a version of the global Torelli theorem for such Teichmuller spaces and use it to deduce the deformation invariance of semiampleness.
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