【廿周年院庆学术报告82】 · 【和山数学论坛第369期】
一、报告题目:High-order Localized Wave Solutions of the New (3+1)-dimensional Kadomtsev-Petviashvili Equation
二、报告人:贺劲松 教授
三、时 间:2023年6月1日(周四)10:00-11:00
四、地 点:闻理园A4-216
报告摘要:Constructing three-dimensional nonlinear evolution equations and exploring their exact solutions have always been important and open problems in real-world applications. The celebrated Korteweg-de Vries equation [KdV] and Kadomtsev-Petviashvili [KP] equation are typical examples of one-dimensional and two-dimensional integrable equations respectively. A natural issue is whether there are integrable analogs of these equations in threedimensional space. In this talk, we give a positive answer. Through special reduction of an (4 + 2)-dimensional KP equation depending on four spatial dimensions and two temporal dimensions, which was introduced by Thanasis Fokas in an early paper, a new (3+1)-dimensional complex-valued KP equation is obtained. We show its Lax pair, smooth multi-soliton and high-order breathers by the Hirota bilinear method. Additionally, we also give the high-order rational solutions by using the long wave limit method. Local characteristics and key properties of these localized waves are discussed. Finally, a family of novel semi-rational solutions of the new (3+1)-dimensional complex-valued KP equation are also presented.
报告人简介:贺劲松教授,深圳大学博士生导师,主要可积非线性偏微分方程(组)的数学理论及其物理应用,多次应邀到 University of Cambridge ,University of Oxford, University of Sheffield等大学访问和报告,负责国家自然科学基金6项, 入选教育部2008年度新世纪优秀人才支持计划(2009-2011), 在国内外SCI学术刊物上发表论文总计180篇, 多次入选“中国高被引学者”。
欢迎广大师生参加!联系人:张永帅,施英,杨云青