Conference on Equivariant and Motivic Homotopy Theory

等变和动机同伦理论会议

• 批准号: 1462793
• 负责人: Kyle Ormsby
• 金额: $ 2.8万
• 依托单位: Reed College
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2015
• 资助国家: 美国
• 起止时间: 2015-05-15 至 2016-04-30
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1462793&HistoricalAwards=false
• 关键词: Conference; Equivariant; Motivic; Homotopy; Theory

This award supports participation in the conference "Equivariant and Motivic Homotopy Theory" held at Reed College, in Portland, Oregon on May 30-31, 2015. This meeting will bring together leading researchers, postdoctoral associates, and graduate students interested in equivariant and motivic homotopy theory to share recent progress and ideas for future research in these fields during a two-day research conference.The conference will focus on the interplay between equivariant and motivic homotopy theory. Each field has enjoyed recent success in resolving a number of longstanding problems, including the Kervaire invariant one problem and the Milnor and Bloch-Kato conjectures. They remain relevant to the study of such wide-ranging topics as topological Hochschild homology, algebraic cobordism, chromatic homotopy theory, and algebraic K-theory, and both topics are vibrant fields of research. The conference will catalyze research progress through a series of eight talks by disciplinary experts and multiple forums in which participants can communicate and collaborate on topics such as (generalized) infinite loop space machines, Picard groups of stable homotopy categories, and computations of stable motivic and equivariant homotopy groups.More information can be found on the conference web pagehttp://people.reed.edu/~ormsbyk/eqmotconf2015/

该奖项支持参加会议参加会议的“模棱两可的同性恋理论”，于2015年5月30日至31日在俄勒冈州波特兰市的里德学院举行。这次会议将召集领先的研究人员，博士博士后伙伴，研究生以及对等效和动机的同性恋者在两次中的进步和思想在这些领域中的进步和思想的兴趣，并在这些领域之间进行分散的研究，并在这些领域中进行研究，并在这些领域中进行研究。同义理论。 每个领域在解决许多长期存在的问题方面取得了成功，包括Kervaire不变的一个问题以及Milnor和Bloch-Kato的猜想。 它们仍然与诸如拓扑Hochschild同源性，代数恢复，色谱均匀理论和代数K理论等广泛主题有关，并且这两个主题都是充满活力的研究领域。 该会议将通过纪律专家和多个论坛的一系列八次演讲来促进研究的进展，参与者可以在这些主题上进行交流和协作，例如（广义）无限环路太空机器，PICARD组，稳定同型类别的PICARD组，以及在稳定的动机和等价同型群中的计算，可以在会议网络上找到更多信息。 pagehttp：//people.reed.edu/~ormsbyk/eqmotconf2015/