Applications of operator K-theory in topology, harmonic analysis, index theory

算子K理论在拓扑、调和分析、指数论中的应用

• 批准号: 0400980
• 负责人: Gennadi Kasparov
• 金额: $ 24.78万
• 依托单位: Vanderbilt University
• 依托单位国家: 美国
• 项目类别: Continuing Grant
• 财政年份: 2004
• 资助国家: 美国
• 起止时间: 2004-05-01 至 2008-04-30
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=0400980&HistoricalAwards=false
• 关键词: Applications; operator; theory; topology; harmonic

Abstract KasparovThe main objective of this project are applications of operator K-theory to a number of well known problems in topology, harmonic analysis and index theory. These problems are the Novikov conjecture on higher signatures of smooth manifolds, the Baum-Connes conjecture in K-theory of group C*-algebras, the problem of multiplicities of automorphic forms, index theory for transversally elliptic operators. Operator K-theory has its origins in the index theory of elliptic operators, and it is most natural to study elliptic operators, including transversally elliptic operators, using operator K-theory. Also operator K-theory is a very suitable tool in applications related to geometric group actions, which makes it exceptionally useful for problems like the Novikov and the Baum-Connes conjectures. Multiplicities of automorphic forms is another topic where operator K-theory gives new approaches to old problems.The development of quantum mechanics in the 20th century has led to the creation of the theory of operators in Hilbert space and later to the creation of the theory of C*-algebras. The theory of C*-algebras is closely related with the contemporary field theory in physics, as well as with geometry, topology, Lie group representation theory, etc. Operator K-theory came to the C*-algebra theory from topology and grew out into a highly powerful tool. Nowadays, operator K-theory is part of the non-commutative geometry which is a synthesis of analysis and geometry with wide applications in many areas of mathematics and theoretical physics. The emphasis of the present project is on the applications of operator K-theory to several well known problems in analysis and topology.

这个项目的主要目的是将算子K-理论应用于拓扑学、调和分析和指数理论中的一些著名问题。这些问题是光滑流形的高阶签名的Novikov猜想，群C*-代数的K-理论中的Baum-Connes猜想，自守形式的重数问题，横截椭圆算子的指标理论。算子K-理论起源于椭圆算子的指数理论，用算子K-理论研究椭圆算子，包括横椭圆算子，是最自然的。此外，算子K理论在与几何群作用相关的应用中是一个非常合适的工具，这使得它对诺维科夫和鲍姆-康纳斯定理等问题非常有用。自守形式的多重性是算子K-理论为解决老问题提供新途径的另一个主题。世纪量子力学的发展导致了希尔伯特空间中算子理论的创立，后来又导致了C*-代数理论的创立。C*-代数理论与当代物理学中的场论以及几何学、拓扑学、李群表示理论等有着密切的联系。算子K-理论是从拓扑学发展到C*-代数理论的一个强有力的工具。算子K-理论是非对易几何的一部分，它是分析与几何的综合，在数学和理论物理的许多领域有着广泛的应用。本项目的重点是算子K-理论在分析和拓扑学中几个著名问题的应用。