Superheavy Skeleta for non-Normal Crossings Divisors

Elliot Gathercole
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Abstract

Given an anticanonical divisor in a projective variety, one naturally obtains a monotone K\"ahler manifold. In this paper, for divisors in a certain class (larger than normal crossings), we construct smoothing families of contact hypersurfaces with controlled Reeb dynamics. We use these to adapt arguments of Borman, Sheridan and Varolgunes to obtain analogous results about symplectic cohomology with supports in the divisor complement. In particular, we will show that several examples of Lagrangian skeleta of such divisor complements are superheavy, in cases where applying Lagrangian Floer theory may be intractable.
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非正交除法的超重斯克莱塔
给定一个投影变中的反凸除数,自然会得到一个单调的 K\"ahler 流形。在本文中,对于某一类中的除数(大于正常交叉),我们构造了具有受控里布动力学的接触曲面的平滑族。我们利用这些来调整博尔曼、谢里登和瓦罗尔贡涅斯的论点,从而得到关于在分部补集中有支持的交映同调的类似结果。特别是,我们将证明,在应用拉格朗日浮子理论可能难以解决的情况下,这种除子补的拉格朗日骨架的几个例子是超重的。
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