Boundedness questions for Calabi–Yau threefolds

IF 0.9 1区数学 Q2 MATHEMATICS

Journal of Algebraic Geometry Pub Date : 2017-06-05 DOI:10.1090/JAG/781

P. Wilson

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引用次数: 13

Abstract

In this paper, we study boundedness questions for (simply connected) smooth Calabi–Yau threefolds. The diffeomorphism class of such a threefold is known to be determined up to finitely many possibilities by the integral middle cohomology and two integral forms on the integral second cohomology, namely the cubic cup-product form and the linear form given by cup-product with the second Chern class. The motivating question for this paper is whether knowledge of these cubic and linear forms determines the threefold up to finitely many families, that is the moduli of such threefolds is bounded. If this is true, then in particular the middle integral cohomology would be bounded by knowledge of these two forms. Crucial to this question is the study of rigid non-movable surfaces on the threefold, which are the irreducible surfaces that deform with any small deformation of the complex structure of the threefold but for which no multiple moves on the threefold. If for instance there are no such surfaces, then the answer to the motivating question is yes (Theorem 0.1). In particular, for given cubic and linear forms on the second cohomology, there must exist such surfaces for large enough third Betti number (Corollary 0.2). The paper starts by proving general results on these rigid non-movable surfaces and boundedness of the family of threefolds. The basic principle is that if the cohomology classes of these surfaces are also known, then boundedness should hold (Theorem 4.5). The second half of the paper restricts to the case of Picard number 2, where it is shown that knowledge of the cubic and linear forms does indeed bound the family of Calabi–Yau threefolds (Theorem 0.3). This appears to be the first non-trivial case where a general boundedness result for Calabi–Yau threefolds has been proved (without the assumption of a special structure).

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Calabi-Yau的三倍有界性问题

本文研究（单连通）光滑Calabi–Yau三重的有界性问题。已知这种三重的微分同胚类由积分中上同调和积分第二上同调上的两个积分形式，即第二Chern类的杯积给出的三次杯积形式和线性形式，确定了多达有限多个可能性。本文的动机问题是，这些三次和线性形式的知识是否决定了有限多个族的三重，也就是说，这三重的模是有界的。如果这是真的，那么特别是中积分上同调将受到这两种形式的知识的限制。这个问题的关键是研究三重上的刚性不可移动表面，这是不可约表面，随着三重复杂结构的任何小变形而变形，但在三重上没有多次移动。例如，如果不存在这样的曲面，那么激励问题的答案是肯定的（定理0.1）。特别是，对于第二上同调上给定的三次和线性形式，对于足够大的第三Betti数（推论0.2），必须存在这样的表面。本文首先证明了这些刚性不可移动曲面的一般结果和三重族的有界性。基本原理是，如果这些曲面的上同调类也是已知的，那么有界性应该成立（定理4.5），其中，证明了三次和线性形式的知识确实约束了Calabi–Yau三重族（定理0.3）。这似乎是第一个证明Calabi-Yau三折叠的一般有界性结果的非平凡情况（没有特殊结构的假设）。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Algebraic Geometry 数学-数学

CiteScore

2.70

自引率

5.60%

发文量

审稿时长

>12 weeks

期刊介绍： The Journal of Algebraic Geometry is devoted to research articles in algebraic geometry, singularity theory, and related subjects such as number theory, commutative algebra, projective geometry, complex geometry, and geometric topology. This journal, published quarterly with articles electronically published individually before appearing in an issue, is distributed by the American Mathematical Society (AMS). In order to take advantage of some features offered for this journal, users will occasionally be linked to pages on the AMS website.