量子交集数和({{\mathbb {C}}}{{\mathbb {P}}}}^1\) )的格罗莫夫-维滕不变式

IF 1.3 3区 物理与天体物理 Q3 PHYSICS, MATHEMATICAL Letters in Mathematical Physics Pub Date : 2024-11-13 DOI:10.1007/s11005-024-01869-x
Xavier Blot, Alexandr Buryak
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引用次数: 0

摘要

杜布罗文、盖雷、罗西和第二位作者的著作中引入了量子陶函数的概念,用于 KdV 层次的自然量子化。随后,第一作者描述了量子陶函数的某种自然选择,该数列的对数系数被称为量子交集数。由于康采维奇-维滕定理,量子交点数的一部分与稳定代数曲线模空间上的经典交点数重合。在本文中,我们将量子交点数与插入霍奇类的 \(({{\mathbb {C}}}{{\mathbb {P}}}}^1,0,\infty )\) 的静态相对格罗莫夫-维滕不变式联系起来。利用奥孔科夫-潘达里潘德方法,通过无限楔形式主义来处理这种不变量(有微不足道的霍奇类),然后我们给出了第一作者发现的量子交集数的 "纯量子 "部分的明确公式的简短证明,特别是把这些数与单部分双赫尔维茨数联系起来。
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Quantum intersection numbers and the Gromov–Witten invariants of \({{{\mathbb {C}}}{{\mathbb {P}}}}^1\)

The notion of a quantum tau-function for a natural quantization of the KdV hierarchy was introduced in a work of Dubrovin, Guéré, Rossi, and the second author. A certain natural choice of a quantum tau-function was then described by the first author, the coefficients of the logarithm of this series are called the quantum intersection numbers. Because of the Kontsevich–Witten theorem, a part of the quantum intersection numbers coincides with the classical intersection numbers of psi-classes on the moduli spaces of stable algebraic curves. In this paper, we relate the quantum intersection numbers to the stationary relative Gromov–Witten invariants of \(({{{\mathbb {C}}}{{\mathbb {P}}}}^1,0,\infty )\) with an insertion of a Hodge class. Using the Okounkov–Pandharipande approach to such invariants (with the trivial Hodge class) through the infinite wedge formalism, we then give a short proof of an explicit formula for the “purely quantum” part of the quantum intersection numbers, found by the first author, which in particular relates these numbers to the one-part double Hurwitz numbers.

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来源期刊
Letters in Mathematical Physics
Letters in Mathematical Physics 物理-物理:数学物理
CiteScore
2.40
自引率
8.30%
发文量
111
审稿时长
3 months
期刊介绍: The aim of Letters in Mathematical Physics is to attract the community''s attention on important and original developments in the area of mathematical physics and contemporary theoretical physics. The journal publishes letters and longer research articles, occasionally also articles containing topical reviews. We are committed to both fast publication and careful refereeing. In addition, the journal offers important contributions to modern mathematics in fields which have a potential physical application, and important developments in theoretical physics which have potential mathematical impact.
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