Fundamental matrix (linear differential equation)

In mathematics, a fundamental matrix of a system of n homogeneous linear ordinary differential equations ${\dot {\mathbf {x} }}(t)=A(t)\mathbf {x} (t)$ is a matrix-valued function $\Psi (t)$ whose columns are linearly independent solutions of the system.^[1] Then every solution to the system can be written as $\mathbf {x} (t)=\Psi (t)\mathbf {c}$ , for some constant vector $\mathbf {c}$ (written as a column vector of height $n$ ).

A matrix-valued function $\Psi$ is a fundamental matrix of ${\dot {\mathbf {x} }}(t)=A(t)\mathbf {x} (t)$ if and only if ${\dot {\Psi }}(t)=A(t)\Psi (t)$ and $\Psi$ is a non-singular matrix for all $t$ .^[2]

^ Somasundaram, D. (2001). "Fundamental Matrix and Its Properties". Ordinary Differential Equations: A First Course. Pangbourne: Alpha Science. pp. 233–240. ISBN 1-84265-069-6.
^ Chi-Tsong Chen (1998). Linear System Theory and Design (3rd ed.). New York: Oxford University Press. ISBN 0-19-511777-8.

[1] Somasundaram, D. (2001). "Fundamental Matrix and Its Properties". Ordinary Differential Equations: A First Course. Pangbourne: Alpha Science. pp. 233–240. ISBN 1-84265-069-6.

[2] Chi-Tsong Chen (1998). Linear System Theory and Design (3rd ed.). New York: Oxford University Press. ISBN 0-19-511777-8.

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