Applications of the Drazin Inverse to Linear Systems of Differential Equations with Singular Constant Coefficients 论文
1976SIAM Journal on Applied Mathematics引用 290
Matrix Theory and AlgorithmsNumerical methods for differential equationsElectromagnetic Scattering and Analysis
摘要
Let A, B be $n \times n$ matrices, f a vector-valued function. A and B may both be singular. The differential equation $Ax' + Bx = f$ is studied utilizing the theory of the Drazin inverse. A closed form for all solutions of the differential equation is given when the equation has unique solutions for consistent initial conditions.