報告題目：Integrable systems: what they are and how many?
報 告 人：王敬萍（University of Kent 教授）
Meeting ID: 732 301 7223
報告摘要：Integrable systems belong to an exceptional class of nonlinear equations, which can be studied with the same completeness as linear systems, at least in principle. They possess a rich set of exact solutions and many hidden properties. Classification of integrable equations is a central problem. There are many approaches to this problem, among which the symmetry approach has proved to be very efficient and powerful. In this talk, I'll give a brief account of recent development of the symmetry approach. The progress has been achieved mainly due to a symbolic representation of the ring of differential polynomials, which enables us to use results from algebraic geometry and number theory.
報告人簡介： 王敬萍，英國肯特大學教授、博士生導師，可積系統領域專家，在國際著名雜志CMP, Theoret. and Math. Phys., Phys. D, Stud. Appl. Math., J. Math. Phys., Nonlinearity, J. Differential Equations, Inverse Problems, J. Nonlinear Sci. 等發表論文五十多篇。