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Topics in Quantum Field Theory
量子场论主题
基本信息
- 批准号:0205977
- 负责人:
- 金额:$ 8.5万
- 依托单位:
- 依托单位国家:美国
- 项目类别:Standard Grant
- 财政年份:2002
- 资助国家:美国
- 起止时间:2002-07-01 至 2003-06-30
- 项目状态:已结题
- 来源:
- 关键词:
项目摘要
This proposal investigates recently discovered algebraic structures which enhance our understanding of quantum field theory and the renormalization group. Kreimer will investigate number theoretic aspects of quantum field theory and their interplay with Hopf algebra structures, with an emphasis on applications to non-perturbative results. Rosenberg will work on the connection between differential geometry and quantum field theory, as suggested by the Birkhoff decomposition in renormalization theory and their corresponding flat connections. Jaffe will extend the methods of constructive field theory in light of these recent developments. In general, this work investigates the mathematical structure of quantum field theory (QFT) and the renormalization group. These are theoretical concepts which underlie the study of matter in phase transitions (e.g. boiling, freezing) as well as physics at the highest energies. While the mathematics behind QFT is still not well understood after fifty years of research, the predicative power of QFT in the laboratory is remarkable for its accuracy. Kreimer and his collaborators have discovered algebraic and combinatorial mathematical structures underlying basic QFT computations, which substantially simplify these calculations. In this research, we will both further the theoretical understanding of these concepts as well as investigate new applications.
这个建议调查最近发现的代数结构,增强了我们对量子场论和重整化群的理解。 Kreimer将研究量子场论的数论方面及其与Hopf代数结构的相互作用,重点是非微扰结果的应用。 罗森伯格将致力于微分几何和量子场论之间的联系,正如重整化理论中的伯克霍夫分解及其相应的平坦连接所建议的那样。 贾菲将根据这些最新的发展来扩展建设性场论的方法。总的来说,这项工作研究了量子场论(QFT)和重整化群的数学结构。这些理论概念是研究物质相变(例如沸腾,冻结)以及最高能量物理学的基础。 虽然经过50年的研究,QFT背后的数学仍然没有得到很好的理解,但QFT在实验室中的预测能力因其准确性而引人注目。 Kreimer和他的合作者已经发现了基本QFT计算的代数和组合数学结构,大大简化了这些计算。 在这项研究中,我们将进一步从理论上理解这些概念,并研究新的应用。
项目成果
期刊论文数量(0)
专著数量(0)
科研奖励数量(0)
会议论文数量(0)
专利数量(0)
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Dirk Kreimer其他文献
Recursive relations in the core Hopf algebra
- DOI:
10.1016/j.nuclphysb.2009.04.025 - 发表时间:
2009-10-21 - 期刊:
- 影响因子:
- 作者:
Dirk Kreimer;Walter D. van Suijlekom - 通讯作者:
Walter D. van Suijlekom
The next-to-ladder approximation for linear Dyson–Schwinger equations
- DOI:
10.1016/j.physletb.2007.01.018 - 发表时间:
2007-03-08 - 期刊:
- 影响因子:
- 作者:
Isabella Bierenbaum;Dirk Kreimer;Stefan Weinzierl - 通讯作者:
Stefan Weinzierl
The Structure of the Ladder Insertion-Elimination Lie Algebra
- DOI:
10.1007/s00220-005-1340-7 - 发表时间:
2005-04-15 - 期刊:
- 影响因子:2.600
- 作者:
Igor Mencattini;Dirk Kreimer - 通讯作者:
Dirk Kreimer
Quantization of gauge fields, graph polynomials and graph homology
规范场、图多项式和图同调的量化
- DOI:
10.1016/j.aop.2013.04.019 - 发表时间:
2013 - 期刊:
- 影响因子:3
- 作者:
Dirk Kreimer;Matthias Sars;Walter D. van Suijlekom - 通讯作者:
Walter D. van Suijlekom
Tensor structure from scalar Feynman matroids
- DOI:
10.1016/j.physletb.2011.03.037 - 发表时间:
2011-04-25 - 期刊:
- 影响因子:
- 作者:
Dirk Kreimer;Karen Yeats - 通讯作者:
Karen Yeats
Dirk Kreimer的其他文献
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{{ truncateString('Dirk Kreimer', 18)}}的其他基金
The Number Theory of Quantum Equations of Motion
量子运动方程的数论
- 批准号:
0603781 - 财政年份:2006
- 资助金额:
$ 8.5万 - 项目类别:
Continuing grant
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