报告主题:NLS Boussinesq 方程的高阶怪波解
报告人:陈勇 教授 (华东师范大学)
报告时间:2019年1月5日(周六)9:30
报告地点:校本部乐乎楼海纳厅
邀请人:张大军
报告摘要: General high-order rogue waves of the nonlinear Schrödinger–Boussinesq equation are obtained by the KP-hierarchy reduction theory, and the N-order rogue waves are expressed with the determinants, whose entries are all algebraic forms, which is shown in the theorem. It is found that the fundamental first-order rogue waves can be classified into three patterns: four petal state, dark state, bright state by choosing different values of parameter α.
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