Mathematical Theory on the Klein-Gordon Equation and Related Models
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Organizer(s): |
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Affiliation:
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Country:
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Zhen Lei
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Fudan University
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Peoples Rep of China
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Yifei Wu
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Tianjin University
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Peoples Rep of China
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Jie Liu
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New York University Abu Dhabi
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United Arab Emirates
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Introduction:
| | The Nonlinear Klein-Gordon equation is a fundamental model in quantum field theory, which describes the dynamics of quantum fields and serves as a building block for more complex theories like quantum electrodynamics (QED), quantum chromodynamics (QCD), and the Standard Model of particle physics. This session aims to facilitate academic discussions on the mathematical theory of the Nonlinear Klein-Gordon equation and related models, covering topics such as well-posedness theory, scattering theory, soliton dynamics, and non-relativistic limit problems. Researchers are invited to participate in this academic exploration, where they will delve into the mathematical intricacies of the Nonlinear Klein-Gordon equation and contribute to a more profound comprehension of its implications in the context of quantum field interactions. |
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| Confirmed Speakers |
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Name: | Affiliation: | Country: |
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Charles Collot | CY Cergy Paris Université | France |
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Chenjie Fan | Chinese Academy of Sciences | Peoples Rep of China |
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Nobu Kishimoto | Kyoto University | Japan |
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Buyang Li | The Hong Kong Polytechnic University | Peoples Rep of China |
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Baoping Liu | Peking University | Peoples Rep of China |
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Masahito Ohta | Tokyo University of Science | Japan |
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Qingtang Su | Chinese Academy of Sciences | Peoples Rep of China |
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Maxime Van de Moortel | Rutgers University | USA |
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Lifeng Zhao | University of Science and Technology of China | Peoples Rep of China |
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Maolin Zhou | Nankai University | Peoples Rep of China |
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