Recent advances in nonlinear Schrodinger systems
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Organizer(s): |
Name:
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Affiliation:
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Country:
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Juncheng Wei
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University of British Columbia
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Canada
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Yuanze Wu
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China University of Mining and Technology
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Peoples Rep of China
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Introduction:
| According to their important applications in mathematical physics and geometry, the nonlinear Schrodinger systems are the hot topics in the community of nonlinear analysis and nonlinear PDEs in the past twenty years or so. Even though various theorems, about the existence, multiplicity and qualitative properties of nontrivial solutions of the nonlinear Schrodinger systems, have been established in the literature under various assumptions by using variational methods, the Lyapunov-Schmidt reduction arguments or the bifurcation methods, there are still lots of unsettled problems in these topics which are very challenging. Thus, it is the time to organize the active researchers on these topics together to report their most recent works and discuss the potential directions in these topics.
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