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Conference on the Interplay of Harmonic Analysis and Geometry
调和分析与几何相互作用会议
基本信息
- 批准号:1803146
- 负责人:
- 金额:$ 2.6万
- 依托单位:
- 依托单位国家:美国
- 项目类别:Standard Grant
- 财政年份:2018
- 资助国家:美国
- 起止时间:2018-04-01 至 2019-03-31
- 项目状态:已结题
- 来源:
- 关键词:
项目摘要
This award provides funding to help defray the expenses of US-based participants in the meeting ``Conference on the Interplay of Harmonic Analysis and Geometry'' (CIHAG), which will be held at Scuola Normale Superiore di Pisa in Cortona, Italy during the week of June 25-29, 2018. Additional information about the conference can be found on the website http://www.math.wisc.edu/fricci2018The 2018 CIHAG meeting is devoted to recent developments in harmonic analysis and many applications to other disciplines. This week-long conference will bring approximately 25 internationally-recognized analysts to Cortona, Italy. Each of them will give a one-hour talk. The 2018 CIHAG meeting will also provide numerous junior participants with the opportunity to give short talks or present posters about their work. The 2018 CIHAG meeting will include a session for discussions of important open problems in harmonic analysis. Priority for funding will be given to early career mathematicians, women, members of underrepresented groups and those without other means of support. This is an important conference in harmonic analysis and its applications that will offer participants the opportunity to learn of state-of-the-art research in harmonic analysis with applications to engineering and other sciences.This award reflects NSF's statutory mission and has been deemed worthy of support through evaluation using the Foundation's intellectual merit and broader impacts review criteria.
该奖项提供资金,以帮助支付美国参与者在会议“谐波分析和几何的相互作用会议”(CIHAG)的费用,该会议将于2018年6月25日至29日在意大利科尔托纳的Scuola Normale Pizziore di比萨举行。 有关会议的更多信息可以在网站http://www.math.wisc.edu/fricci2018The上找到 2018年CIHAG会议致力于谐波分析的最新发展以及其他学科的许多应用。这个为期一周的会议将带来约25名国际公认的分析师科尔托纳,意大利。每个人都将做一个小时的演讲。2018年CIHAG会议还将为众多初级参与者提供简短演讲或展示其工作海报的机会。2018年CIHAG会议将包括一个讨论谐波分析中重要开放问题的会议。优先资助早期职业数学家、妇女、代表性不足的群体成员和没有其他支持手段的人。这是谐波分析及其应用领域的一次重要会议,将为与会者提供了解谐波分析最新研究及其在工程和其他科学中的应用的机会。该奖项反映了NSF的法定使命,并通过使用基金会的智力价值和更广泛的影响审查标准进行评估,被认为值得支持。
项目成果
期刊论文数量(0)
专著数量(0)
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Loredana Lanzani其他文献
Hardy Spaces of Holomorphic Functions for Domains in ℂn with Minimal Smoothness
具有最小平滑度的 ℂn 域的全纯函数 Hardy 空间
- DOI:
- 发表时间:
2016 - 期刊:
- 影响因子:0
- 作者:
Loredana Lanzani;E. Stein - 通讯作者:
E. Stein
Hardy spaces of holomorphic functions for domains in $\mathbb C^n$ with minimal smoothness
$mathbb C^n$ 中域的全纯函数 Hardy 空间,具有最小平滑度
- DOI:
- 发表时间:
2015 - 期刊:
- 影响因子:0
- 作者:
Loredana Lanzani;E. Stein - 通讯作者:
E. Stein
Regularity of a $$\overline{\partial }$$-Solution Operator for Strongly $$\mathbf{C}$$-Linearly Convex Domains with Minimal Smoothness
$$overline{partial }$$-强$$mathbf{C}$$-具有最小平滑度的线性凸域的解算子的正则性
- DOI:
10.1007/s12220-020-00443-w - 发表时间:
2019 - 期刊:
- 影响因子:0
- 作者:
Xianghong Gong;Loredana Lanzani - 通讯作者:
Loredana Lanzani
HARMONIC ANALYSIS TECHNIQUES IN SEVERAL COMPLEX VARIABLES SU UN’ APPLICAZIONE DELL’ ANALISI ARMONICA REALE ALL’ANALISI COMPLESSA IN PIU’ VARIABILI
多个复变量的调和分析技术 SU UN’ APPLICAZIONE DELL’ ANALISI ARMONICA REALE ALL’ANALISI COMPLESSA IN PIU’ VARIABILI
- DOI:
- 发表时间:
2015 - 期刊:
- 影响因子:0
- 作者:
Loredana Lanzani - 通讯作者:
Loredana Lanzani
A transform pair for bounded convex planar domains
有界凸平面域的变换对
- DOI:
- 发表时间:
2023 - 期刊:
- 影响因子:0
- 作者:
Jesse Hulse;Loredana Lanzani;Stefan Llewellyn Smith;Elena Luca - 通讯作者:
Elena Luca
Loredana Lanzani的其他文献
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{{ truncateString('Loredana Lanzani', 18)}}的其他基金
Collaborative Research: The Northeast Analysis Network
合作研究:东北分析网
- 批准号:
1900105 - 财政年份:2019
- 资助金额:
$ 2.6万 - 项目类别:
Standard Grant
Holomorphic Singular Integrals in Several Complex Variables and Applications
多复变量中的全纯奇异积分及其应用
- 批准号:
1901978 - 财政年份:2019
- 资助金额:
$ 2.6万 - 项目类别:
Standard Grant
Holomorphic Singular Integral techniques for Non-Smooth domains and applications
非光滑域和应用的全纯奇异积分技术
- 批准号:
1503612 - 财政年份:2015
- 资助金额:
$ 2.6万 - 项目类别:
Continuing Grant
Holomorphic Singular Integrals on Non-Smooth Domains in Complex Analysis
复分析中非光滑域上的全纯奇异积分
- 批准号:
1504589 - 财政年份:2014
- 资助金额:
$ 2.6万 - 项目类别:
Standard Grant
Holomorphic Singular Integrals on Non-Smooth Domains in Complex Analysis
复分析中非光滑域上的全纯奇异积分
- 批准号:
1001304 - 财政年份:2010
- 资助金额:
$ 2.6万 - 项目类别:
Standard Grant
Singular Integrals and Complex Analysis in One and Several Variables
一变量和多变量的奇异积分和复分析
- 批准号:
0101212 - 财政年份:2001
- 资助金额:
$ 2.6万 - 项目类别:
Continuing Grant
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