Complex Analysis and Spectral Theory

复分析与谱理论

• 批准号: RGPIN-2020-04263
• 负责人: Ransford, Thomas
• 金额: $ 2.7万
• 依托单位: Université Laval
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2020
• 资助国家: 加拿大
• 起止时间: 2020-01-01 至 2021-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=716915
• 关键词: Complex; Analysis; Spectral; Theory

The long-term objective of my research is to gain a better understanding of the interactions between complex analysis and operator theory. In recent years my work has focused on holomorphic function spaces. These are closely connected to operators. Indeed, the functions that act on a given operator typically emerge from a suitably chosen holomorphic function space. In the other direction, holomorphic function spaces are often best understood in terms of concrete operators that act on them. The proposed research program pursues both lines of enquiry. The first part of the proposal is to study Hilbert-space operators via their numerical range. It comprises two interlinked projects, one concerning mapping theorems for numerical range, and the other to prove the so-called Crouzeix conjecture. A proof of this conjecture would very like lead to an improved structure theorem for operators on a Hilbert space. The second part of the proposal consists of three projects concerning function spaces. The first project is to establish an automatic continuity theorem, and thereby extend the classic Gleason-Kahane-Zelazko theorem to a wide variety of function spaces. The second is to find constructive methods for polynomial approximation in certain function spaces where these methods are currently lacking. And the third project is to investigate a curious, recently-discovered phenomenon arising in the Nyman-Beurling approach to the Riemann hypothesis. For no apparent reason, at least the first billion entries of a certain infinite triangular matrix associated to the Riemann zeta function are all positive. Is this is true of all the entries? If so, what are the implications, if any, for the Riemann hypothesis?

我研究的长期目标是更好地理解复分析和算子理论之间的相互作用。近年来，我的工作主要集中在全纯函数空间。这与运营商密切相关。事实上，作用于给定算子的函数通常来自于适当选择的全纯函数空间。在另一个方向，全纯函数空间通常最好用作用于它们的具体算子来理解。拟议的研究计划追求两条调查线。 该计划的第一部分是通过数值范围来研究希尔伯特空间算子。它包括两个相互关联的项目，一个涉及映射定理的数值范围，和其他证明所谓的Crouzeix猜想。这个猜想的证明很可能会导致希尔伯特空间上算子的结构定理的改进。 提案的第二部分包括三个关于功能空间的项目。第一个项目是建立一个自动连续性定理，从而将经典的Gleason-Kahane-Zelazko定理推广到各种各样的函数空间。第二个是在某些函数空间中找到多项式逼近的构造性方法，这些方法目前缺乏。第三个项目是调查一个奇怪的，最近发现的现象，出现在尼曼-伯林方法的黎曼假设。没有明显的原因，至少与黎曼zeta函数相关的某个无限三角矩阵的前10亿个元素都是正的。所有条目都是这样吗？如果是这样的话，对黎曼假设有什么影响？