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确定线性偏微分方程组可积系统的对合特征集方法
引用本文:孟晓辉,陈玉福. 确定线性偏微分方程组可积系统的对合特征集方法[J]. 系统科学与数学, 2006, 26(4): 440-455
作者姓名:孟晓辉  陈玉福
作者单位:1. 中国科学院研究生院,北京,100049
2. 中国科学院数学机械化重点实验室,北京,100080
基金项目:国家863项目(2002AA103061),中科院研究生院科研启动基金(KYQD200502)资助课题
摘    要:基于Ritt-Wu特征集方法和Riquier-Janet理论,给出一种将线性微分方程组化成简单标准形式的有效算法.该算法通过消去冗余和添加可积条件获得线性微分方程组的完全可积系统(有形式幂级数解)或不相容判定.该算法不仅适用于常系数的线性偏微分方程组,而且对于变系数(以函数为系数)仍然有效.作者还给出了完全可积系统判定定理及其严格证明.

关 键 词:线性偏微分方程组  完全可积系统  对合特征集  延拓方向
修稿时间:2003-12-04

on Completely Integrable System of Linear PDEs with Involutive Characteristic Set Method
Meng Xiaohui,Chen Yufu. on Completely Integrable System of Linear PDEs with Involutive Characteristic Set Method[J]. Journal of Systems Science and Mathematical Sciences, 2006, 26(4): 440-455
Authors:Meng Xiaohui  Chen Yufu
Affiliation:Graduate University of the CAS, Beijing 100049; KLMM-CAS, Beijing 100080
Abstract:Based on the Ritt-Wu's characteristic set method and Riquier-Janet theory, an algorithm to reduce the linear PDE system to a normal form is presented. With this algorithm, we get completely integrable system of linear PDE system by removing redundant terms and adding new integrability conditions. The theorem determining whether a system is completely integrable is given in the paper, and its proof is provided as well. Our algorithm is applicable not only to the linear PDEs with constant coefficients but also to the general case.
Keywords:Linear partial differential equations   completely integrable system   involutive characteristic set   prolongation direction.
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