期刊名： Geometry

期刊主页：https://www.mdpi.com/journal/geometry

本期编辑荐读与您分享Geometry期刊2025年发表的部分精选文章，其中数篇文章出自期刊编委的研究团队，希望能为相关领域学者提供新的思路和参考，欢迎阅读。

1. How Null Vector Performs in a Rational Bézier Curve with Mass Points

零向量在含质量点的有理贝塞尔曲线中的作用机制

https://www.mdpi.com/3042-402X/2/1/1

Garnier, L.; Bécar, J.-P.; Fuchs, L. How Null Vector Performs in a Rational Bézier Curve with Mass Points. Geometry 2025, 2, 1. https://doi.org/10.3390/geometry2010001

2. Rigidity of Holomorphically Projective Mappings of Kähler and Hyperbolic Kähler Spaces with Finite Complete Geodesics

具有有限条完备测地线的凯勒空间与双曲凯勒空间的全纯射影映射的刚性

https://www.mdpi.com/3042-402X/2/1/3

Mikeš, J.; Hinterleitner, I.; Peška, P.; Vítková, L. Rigidity of Holomorphically Projective Mappings of Kähler and Hyperbolic Kähler Spaces with Finite Complete Geodesics. Geometry 2025, 2, 3. https://doi.org/10.3390/geometry2010003

3. A Theoretical Framework for Computing Generalized Weighted Voronoi Diagrams Based on Lower Envelopes

基于下包络的广义加权 Voronoi 图计算的理论框架

https://www.mdpi.com/3042-402X/2/2/5

Held, M.; de Lorenzo, S. A Theoretical Framework for Computing Generalized Weighted Voronoi Diagrams Based on Lower Envelopes. Geometry 2025, 2, 5. https://doi.org/10.3390/geometry2020005

4. Hyperbolic Cords and Wheels

双曲绳构造与滚轮构造

https://www.mdpi.com/3042-402X/2/2/6

Simoson, A.J. Hyperbolic Cords and Wheels. Geometry 2025, 2, 6. https://doi.org/10.3390/geometry2020006

5. Defining and Visualizing the Geometry of Relativistic Physics

相对论物理几何的定义与可视化

https://www.mdpi.com/3042-402X/2/2/7

Friedman, Y.; Scarr, T. Defining and Visualizing the Geometry of Relativistic Physics. Geometry 2025, 2, 7. https://doi.org/10.3390/geometry2020007

6. On the Relation Between a Locus and Poncelet’s Closure Theorem

轨迹与庞塞莱闭合定理之间的关系

https://www.mdpi.com/3042-402X/2/2/8

Blazek, J. On the Relation Between a Locus and Poncelet’s Closure Theorem. Geometry 2025, 2, 8. https://doi.org/10.3390/geometry2020008

7. On Yiu’s Equilateral Triangles Associated with a Kiepert Hyperbola

与基佩尔特双曲线相关的 Yiu 等边三角形

https://www.mdpi.com/3042-402X/2/3/10

Perng, C.-t. On Yiu’s Equilateral Triangles Associated with a Kiepert Hyperbola. Geometry 2025, 2, 10. https://doi.org/10.3390/geometry2030010

8. On d and M Problems for Newtonian Potentials in Euclidean n Space

欧氏 n 维空间中牛顿势的 d 与 M 问题

https://www.mdpi.com/3042-402X/2/3/14

Lewis, J. On d and M Problems for Newtonian Potentials in Euclidean n Space. Geometry 2025, 2, 14. https://doi.org/10.3390/geometry2030014

9. A Discrete Schwarzian Derivative via Circle Packing

基于圆堆积的离散 Schwarzian 导数

https://www.mdpi.com/3042-402X/2/4/16

Stephenson, K. A Discrete Schwarzian Derivative via Circle Packing. Geometry 2025, 2, 16. https://doi.org/10.3390/geometry2040016

Geometry期刊介绍

主编：Prof. Dr. Yang-Hui He, London Institute for Mathematical Sciences, Royal Institution, UK

Geometry（ISSN 3042-402X）是一个国际性、同行评审、开放获取的学术期刊，专注于几何学领域多样的理论研究与应用探索。其重点关注领域包括欧几里得几何、微分几何、代数几何、复几何、离散几何、计算几何、几何群论、几何分析以及凸几何等。