Relative Equilibria on the S2 Sphere


报告人:Ernesto Pérez-Chavela 教授

报告人单位:Department of Mathematics, ITAM(墨西哥自治理工大学数学系)

报告时间:20220607日(周二)9:00-10:00 

报告地点:线上报告(腾讯会议ID597-290-673,无密码)


摘要The simplest solutions of the N-body problem are those where the mutual distances among the masses remain constant for all time, that is the motions which behave as a rigid body. For N = 3 on the Euclidean space it is well known that there are exactly ve relative equilibria: three collinear (Euler relative equilibria) and two planar forming anequilateral triangle (Lagrange relative equilibria). In this talk I will show a new geometrical technique to study relative equilibria when the masses are on a sphere in , when the masses are moving under the inuence of a general attractive potential. In this case collinear relative equilibria means that the masses are on the same geodesic otherwise we call them Lagrange relative equilibria.


报告人简介:Ernesto Pérez-Chavela 教授是墨西哥国家科学院院士,墨西哥ITAM 数学系教授,国际著名的天体力学专家,早年曾跟美国国家科学院院士 D.Sarri做过博士后。Ernesto Pérez-Chavela教授早年在多体问题的中心构型及D.Sarri猜想方面有很好的工作,在国际著名刊物 Archiv Rational Mech., Trans.AMS, Cel.Mech.等发表多篇论文,近十年他与Diacu, Martinez等教授在弯曲空间中的多体问题理论上取得突破,他们在J. of Nonlinear Science,Transacation of AMS, Physica D, J. of Differential Equations , Nonlinearity等重要刊物发表论文多篇。

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