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Mathematical Education, 2006, Issue 1(36), Pages 2–9 (Mi mo437)  
Students and teachers of mathematical specialties

Systems of Linear Differential Equations. Integrable Combinations. Part I

V. V. Ivlev, E. Grjibovskaya
Full-text PDF (252 kB)
Abstract: For a linear system dy/dx = Ay the scalar product (a, y ) , where $\alpha$ is an eigenvector or a root vector of the conjugate operator $A^T$, satisfies a linear equation of the first order. This observation provides a method of integrating the original system.
Document Type: Popular science or education materials
Language: Russian
Citation: V. V. Ivlev, E. Grjibovskaya, “Systems of Linear Differential Equations. Integrable Combinations. Part I”, Math. Ed., 2006, no. 1(36), 2–9
Citation in format AMSBIB
\Bibitem{IvlGrj06}
\by V.~V.~Ivlev, E.~Grjibovskaya
\paper Systems of Linear Differential Equations. Integrable Combinations. Part I
\jour Math. Ed.
\yr 2006
\issue 1(36)
\pages 2--9
\mathnet{http://mi.mathnet.ru/mo437}
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