The characterization of (𝑛 − 1)-spheres with 𝑛 + 4 vertices having maximal Buchstaber number

Suyoung Choi, Hyeontae Jang, Mathieu Vallée
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Abstract

We present a computationally efficient algorithm that is suitable for graphic processing unit implementation. This algorithm enables the identification of all weak pseudo-manifolds that meet specific facet conditions, drawn from a given input set. We employ this approach to enumerate toric colorable seeds. Consequently, we achieve a comprehensive characterization of ( n − 1 ) (n-1) -dimensional PL spheres with n + 4 n+4 vertices that possess a maximal Buchstaber number. A primary focus of this research is the fundamental categorization of non-singular complete toric varieties of Picard number 4. This classification serves as a valuable tool for addressing questions related to toric manifolds of Picard number 4. Notably, we have determined which of these manifolds satisfy equality within an inequality regarding the number of minimal components in their rational curve space. This addresses a question posed by Chen, Fu, and Hwang in 2014 for this specific case.
具有𝑛 + 4 个顶点且布赫施塔伯数最大的 (𝑛 - 1) 球体的特征描述
我们提出了一种适用于图形处理单元实现的高效计算算法,该算法可以从给定的输入集合中识别出符合特定面条件的所有弱伪流形。我们利用这种方法列举了环状可着色种子,从而全面描述了具有 n + 4 n+4 顶点且拥有最大布赫斯塔伯数的 ( n - 1 ) (n-1) 维 PL 球。这项研究的一个主要重点是对皮卡尔数 4 的非星形完全环状品种进行基本分类。这个分类是解决与皮卡尔数 4 的环状流形相关问题的一个有价值的工具。值得注意的是,我们确定了这些流形中哪些流形在其有理曲线空间中的最小分量数方面满足不等式内的相等。
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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