Nonlinear Wave Equations in Mathematical Physics
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Organizer(s): |
Name:
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Affiliation:
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Country:
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Shihui Zhu
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Sichuan Normal University
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Peoples Rep of China
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Yue Liu
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University of Texas at Arlington
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USA
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Zhijun Qiao
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University of Texas Rio Grande Valley
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USA
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Jian Zhang
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University of Electronic Science and Technology of China
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Peoples Rep of China
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Introduction:
| | Nonlinear wave phenomenon is one of very important components of applied mathematics and nonlinear sciences with profound relations to PDEs, Lie algebra, nonlinear analysis, symplectic geometry, and other branches of mathematics as well as significant applications in nonlinear optics, fluid dynamics, theoretical mechanics, theoretical physics and mathematical physics, and many other natural and social sciences. This session provides a platform for active researchers to present their latest work on nonlinear wave equations arising from mathematical physics, including nonlinear Schrodinger equation, KdV equation, Boussinesq equation, AKNS equation, Camassa-Holm equation, and other integrable systems with their related topics. Our participants will share their recent results, discuss open challenges, and build new collaborative ties during the conference. We hope that this session can cast on a lasting impact on the future of the field and the research impact of the session topics will be significant for all our participants. |
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| Confirmed Speakers |
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Name: | Affiliation: | Country: |
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Yue Liu | UTA | USA |
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Zhijun Qiao | UTRGV | USA |
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Shihui Zhu | Sichuan Normal University | Peoples Rep of China |
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