Duality theories of topological groups and topological algebras

拓扑群和拓扑代数的对偶理论

• 批准号: 341291-2007
• 负责人: Lukacs, Gabor
• 金额: $ 0.73万
• 依托单位: University of Manitoba
• 依托单位国家: 加拿大
• 项目类别: Discovery Grants Program - Individual
• 财政年份: 2010
• 资助国家: 加拿大
• 起止时间: 2010-01-01 至 2011-12-31
• 项目状态: 已结题
• 来源: https://www.nserc-crsng.gc.ca/ase-oro/Details-Detailles_eng.asp?id=458312
• 关键词: Duality; theories; topological; groups; algebras

The concept of duality dates back to the time of the French mathematician Evariste Galois (1811-1832), who formulated the criterion for solubility of polynomial equations in a single variable by radicals (n-th roots). At the heart of Galois' solution lies a correspondence between the algebraic structures containing some of the solutions of a given polynomial (called "intermediate field extensions") and substructures of an algebraic structure invented by Galois that is typical to the polynomial (the "Galois group" of the polynomial). An important property of this correspondence is that it reverses the inclusion relation: The larger the intermediate field extension is, the smaller the corresponding substructure is, and vice versa. Although dualities frequently occur in mathematics, they are less often recognized as such. For instance, the starting point of affine algebraic geometry is a duality between sets zero-sets of polynomials in several variables ("algebraic sets") and sets of polynomials with special properties ("radical ideals"). The main feature common to all meaningful dualities is the collection of pairs of dual properties, that is, pairs (P,Q) such that an object satisfies P if and only if its dual possesses Q. The long-term goal of the proposed research is discovering a duality for topological groups with sufficiently many interesting pairs of properties (P,Q) of the above-mentioned type. I do not rule out the possibility that such duality does not exist, in which case, I hope to prove that it is impossible to construct such a duality. In the course of this project, I anticipate to also investigate mathematical objects that are closely related to quantum-mechanics (namely, operator algebras and their generalizations). Any progress in this program outlined will not only contribute to the understanding of topological groups and algebras, but will also considerably stimulate research in these areas, and will cause noticeable "brain drain." From the point of view of the effect on the mathematical community, duality theories often serve as tunnels between two or more otherwise remote areas of mathematics. Thus, dualities have the potential of creating synergy between researchers of distant areas.

对偶性的概念可以追溯到法国数学家埃瓦里斯特·伽罗瓦（Evariste Galois，1811-1832）的时代，他用根式（n次方根）制定了多项式方程在单变量中的可解性准则。伽罗瓦解的核心在于包含给定多项式的一些解的代数结构（称为“中间域扩张”）与伽罗瓦发明的多项式的典型代数结构（多项式的“伽罗瓦群”）的子结构之间的对应。这种对应的一个重要性质是它颠倒了包含关系：中间域扩张越大，对应的子结构越小，反之亦然。虽然对偶经常出现在数学中，但它们很少被承认。例如，仿射代数几何的出发点是多元多项式的零集（“代数集”）和具有特殊性质的多项式集（“根理想”）之间的对偶。所有有意义的对偶的主要共同特征是对偶性质对的集合，即对（P，Q）使得一个对象满足P当且仅当它的对偶具有Q。所提出的研究的长期目标是发现具有足够多的上述类型的有趣的属性对（P，Q）的拓扑群的对偶。我不排除这种对偶性不存在的可能性，在这种情况下，我希望证明不可能构造这样的对偶性。在这个项目的过程中，我预计也将研究与量子力学密切相关的数学对象（即算子代数及其推广）。任何进展，在这一计划概述将不仅有助于理解拓扑群和代数，但也将大大刺激研究在这些领域，并会造成显着的“人才流失。“从对数学界的影响来看，对偶理论经常充当两个或多个数学偏远地区之间的隧道。因此，二元性有可能在遥远地区的研究人员之间产生协同作用。