Dynamics Around Translation Surfaces

平移表面周围的动力学

• 批准号: 2350393
• 负责人: Jonathan Chaika
• 金额: $ 34.55万
• 依托单位: University of Utah
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2024
• 资助国家: 美国
• 起止时间: 2024-07-01 至 2027-06-30
• 项目状态: 未结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=2350393&HistoricalAwards=false
• 关键词: Dynamics; Around; Translation; Surfaces

This award will support a project in dynamical systems. The mathematical field of dynamical systems seeks to understand how a system behaves as time evolves; it is an important subfield of mathematical analysis, which enjoys connections and applications to many other areas of the mathematical sciences. The systems at the heart of this project are connected to physics and geometry. A concrete example is that of a point mass traveling inside a polygon, which has elastic collision when it hits the sides. One focus of the project is to understand how prevalent randomness is in these systems. The PI will also investigate the structure of paths in related dynamical systems and aims to deepen our understanding of the connection between geometric and dynamical properties. This project will also stimulate the growth of the next generation of mathematicians by providing graduate student research opportunities. This project is concerned with two closely related dynamical systems: flows on translation surfaces and the SL(2,R) action on the space of translation surfaces. It seeks to better understand when the spectrum of (the one-parameter unitary group coming from) a flow on a translation surface is continuous (aside from a simple eigenvalue of 0). It seeks to understand the dynamics of the strictly upper triangular subgroup of SL(2,R) on spaces of translation surfaces. In particular, whether there are situations where the orbit closures are always constrained and how wild averages along orbits can behave.This award reflects NSF's statutory mission and has been deemed worthy of support through evaluation using the Foundation's intellectual merit and broader impacts review criteria.

该奖项将支持动力系统项目。动力系统的数学领域旨在理解系统如何随着时间的演变而表现。它是数学分析的一个重要子领域，与数学科学的许多其他领域有联系和应用。该项目的核心系统与物理学和几何学相关。一个具体的例子是，在多边形内移动的点质量，当它撞击侧面时会发生弹性碰撞。 该项目的重点之一是了解这些系统中随机性的普遍程度。 PI还将研究相关动力系统中的路径结构，旨在加深我们对几何和动力特性之间联系的理解。 该项目还将通过提供研究生研究机会来刺激下一代数学家的成长。该项目涉及两个密切相关的动力系统：平移表面上的流动和平移表面空间上的 SL(2,R) 作用。它试图更好地理解平移表面上的流（来自的单参数酉群）的频谱何时是连续的（除了简单的特征值 0 之外）。它旨在了解 SL(2,R) 的严格上三角子群在平移曲面空间上的动力学。特别是，是否存在轨道闭合始终受到限制的情况以及沿轨道的平均平均值如何表现。该奖项反映了 NSF 的法定使命，并通过使用基金会的智力价值和更广泛的影响审查标准进行评估，被认为值得支持。