摘要
本文探讨了矩阵特征值理论在求解一类一阶与二阶混合阶数的常系数线性微分方程组中的应用.重点分析了系数矩阵特征值的重数与其对应线性无关特征向量个数之间存在等于或大于2种关系时,微分方程组的通解求解方法.尤其是当特征值的重数大于其对应线性无关特征向量的个数时,通过构造Jordan链求出广义特征向量,使广义特征向量与线性无关特征向量的总数等于该特征值的重数,进而求出微分方程组的通解.最后,通过具体应用实例验证了该方法的可行性与有效性.
This paper explores the application of matrix eigenvalue theory in solving a class of linear differential equation systems with constant coefficients involving a mixture of first-order and second-order derivatives.It focuses on analyzing the general solution methods for such systems when the algebraic multiplicity of an eigenvalue of the coefficient matrix is equal to or greater than the number of its corresponding linearly independent eigenvectors.In particular,when the algebraic multiplicity of an eigenvalue is greater than the number of its corresponding linearly independent eigenvectors,generalized eigenvectors are derived by constructing Jordan chains so that the total number of generalized eigenvectors and linearly independent eigenvectors equals the algebraic multiplicity of the eigenvalue,thereby yielding the general solution to the differential equation systems.Finally,the feasibility and effectiveness of the proposed method are verified through specific application examples.
作者
王艳华
王站立
WANG Yanhua;WANG Zhanli
出处
《辽宁师专学报(自然科学版)》
2026年第1期1-5,100,共6页
Journal of Liaoning Normal Colleges(Natural Science Edition)
关键词
二阶微分方程组
矩阵理论
对角化
Jordan链
特征值
mixed differential equation systems
matrix theory
diagonalization
Jordan chain
eigenvalue
