5月演講
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Applied Mathematics Seminar, Prof. Moody T. Chu, North Carolina State University
Wednesday, May 1, 15:10—16:00 數學系館3樓會議室
Title: On the Dynamics of the Maximin Flow Abstract: In a complex system, such as the molecular dynamics, chemical kinetics, nucleation mechanism, or even the Lagrangian of a constrained convex programming problem, the presence of a saddle point often represents that a transition of events has occurred. Determining the locations of saddle points in the configuration space and the way they affect the transition provide critical information about the underlying complex system. This paper proposes a dynamical system approach to explore this problem. In addition to being capable of finding saddle points, the flow exhibits some intriguing behavior nearby a saddle point, which is demonstrated by graphic examples in various settings. Maximin flows also arise naturally from complex-valued differential equations over analytic vector fields due to the Cauchy-Riemann equations. The maximin flow can be cast as a gradient flow in the Krein space under indefinite inner product, whence the Lojasiewicz gradient inequality can be generalized. It is proved that a solution trajectory has finite arc length and, hence, converges to a singleton saddle point.
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Colloquium, 日本東京大學數學系 川又雄二郎教授
Thursday, May 2, 16:10—17:00 數學系館3樓會議室
Title: TBA Abstract:TBA
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Colloquium, 陽明交通大學應用數學系 吳昌鴻教授
Thursday, May 9, 16:10—17:00 數學系館3樓會議室
Title: TBA Abstract:TBA
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