Collaborative Research: AGNES. Algebraic Geometry NorthEastern Series

合作研究：AGNES。

• 批准号: 1066154
• 负责人: Jason Starr
• 金额: $ 2万
• 依托单位: SUNY at Stony Brook
• 依托单位国家: 美国
• 项目类别: Standard Grant
• 财政年份: 2011
• 资助国家: 美国
• 起止时间: 2011-04-01 至 2014-03-31
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1066154&HistoricalAwards=false
• 关键词: Collaborative; Research; AGNES.; Algebraic; Geometry

Algebraic geometry has a strong and broad representation at the research institutions of the Northeastern states. AGNES is a series of biannual workshops that intends to further the interaction and collaborations between the algebraic geometers in the area. Each workshop is held over a weekend at one of the participating institutions. The workshops include research talks by renowned experts and junior researchers, both from outside the area and within. Professional development sessions and introductory pre-talks are aimed particularly at graduate students. Every workshop culminates with an open problem session. This gives an opportunity to disseminate recent results and developments, and exchange ideas and views about future directions of algebraic geometry.Algebraic geometry is the study of spaces defined by polynomial equations. Many of the spaces occurring in nature are of this type, and for this reason algebraic geometry has found diverse applications in the sciences. In particular, there are strong connections with recent work in theoretical physics (string theory). This grant will support a series of algebraic geometry conferences in the Northeastern states. The key aims of the series are to expose graduate students to a broad spectrum of research in the field and to improve communication between the many algebraic geometers in the northeast.

代数几何在美国东北部各州的研究机构中具有强大而广泛的代表性。AGNES是一系列两年一度的研讨会，旨在促进该地区代数几何学家之间的互动和合作。每个讲习班在一个参加机构举行，为期一个周末。研讨会包括由知名专家和初级研究人员，无论是来自该地区内外的研究会谈。专业发展课程和介绍性的预会谈是特别针对研究生。每个研讨会都以一个开放的问题会议结束。这提供了一个机会，传播最近的成果和发展，并交流思想和意见，对未来的方向代数几何。代数几何是研究空间定义的多项式方程。自然界中的许多空间都属于这种类型，因此代数几何在科学中有着广泛的应用。特别是，它与理论物理学（弦理论）的最新工作有着密切的联系。这笔赠款将支持一系列代数几何会议在东北各州。该系列的主要目的是让研究生接触到该领域的广泛研究，并改善东北部许多代数几何学家之间的沟通。