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Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
基本信息
- 批准号:RGPIN-2017-03892
- 负责人:
- 金额:$ 1.02万
- 依托单位:
- 依托单位国家:加拿大
- 项目类别:Discovery Grants Program - Individual
- 财政年份:2018
- 资助国家:加拿大
- 起止时间:2018-01-01 至 2019-12-31
- 项目状态:已结题
- 来源:
- 关键词:
项目摘要
Number theory, which is motivated by the study of numbers and equations, has existed since the dawn of recorded history. Perhaps because of its fundamental role in mathematics, number theory continues to be an active area of research, with a wide applicability and relevance to applications.******This research program aims to study and answer some fundamental open questions in number theory concerning a natural class of diophantine equations known as modular varieties, with a view towards developing stronger methods for tackling the Fermat-Catalan conjecture, a natural generalization of Fermat's Last Theorem.******The approach is fundamental science and problem motivated but will also involve the development of new methods and theory in the areas of Galois representations, modular symbols, and Frey abelian variety constructions.******In terms of relevance to applications, the proposed research enhances our foundational knowledge concerning elliptic and hyperelliptic curves, number and function fields, as well as explicit aspects of representation theory. ******The expertise gained from the fundamental science component of this proposal will also be used to study the application motivated problem of homomorphic encryption and its resistance to quantum algorithms, which is relevant to maintaining privacy in big data applications.**
数论是由对数字和方程的研究推动的,自有历史记录以来就已经存在。也许是因为它在数学中的基础作用,数论仍然是一个活跃的研究领域,具有广泛的适用性和与应用的相关性。******本研究计划旨在研究和回答数论中一些基本的开放问题,这些问题涉及称为模簇的自然类丢番图方程,以期开发更强大的方法来解决费马-加泰罗尼亚猜想,费马最后猜想的自然推广 定理。******该方法是基础科学和问题驱动的,但也涉及伽罗瓦表示、模符号和弗雷阿贝尔簇构造领域的新方法和理论的发展。******在与应用的相关性方面,所提出的研究增强了我们关于椭圆和超椭圆曲线、数和函数域以及表示论的显式方面的基础知识。 ******从该提案的基础科学部分获得的专业知识还将用于研究同态加密的应用驱动问题及其对量子算法的抵抗,这与维护大数据应用中的隐私相关。**
项目成果
期刊论文数量(0)
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Chen, Imin其他文献
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{{ truncateString('Chen, Imin', 18)}}的其他基金
Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
- 批准号:
RGPIN-2017-03892 - 财政年份:2022
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
- 批准号:
RGPIN-2017-03892 - 财政年份:2021
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
- 批准号:
RGPIN-2017-03892 - 财政年份:2020
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
- 批准号:
RGPIN-2017-03892 - 财政年份:2019
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties, generalized Fermat equations, and special functions
模簇、广义费马方程和特殊函数
- 批准号:
RGPIN-2017-03892 - 财政年份:2017
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties and diophantine problems
模块品种和丢番图问题
- 批准号:
227250-2009 - 财政年份:2014
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties and diophantine problems
模块品种和丢番图问题
- 批准号:
227250-2009 - 财政年份:2013
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties and diophantine problems
模块品种和丢番图问题
- 批准号:
227250-2009 - 财政年份:2012
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties and diophantine problems
模块品种和丢番图问题
- 批准号:
227250-2009 - 财政年份:2011
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
Modular varieties and diophantine problems
模块品种和丢番图问题
- 批准号:
227250-2009 - 财政年份:2010
- 资助金额:
$ 1.02万 - 项目类别:
Discovery Grants Program - Individual
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正则半单Hessenberg varieties上的代数拓扑
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合作研究:泊松簇的广义簇结构及其应用
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Modular varieties, generalized Fermat equations, and special functions
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广义双曲性和代数簇的几何
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