We have a given ODE
$ K(x)_{_{3 \times 3}}=xC_1K(x)+x^3C_2K'(x) \tag 1$
where $C_1,C_2$ are constant skew symmetric matrices of dimension $3 \times 3$ with determinant $0$. How do we solve $K(x)$?
2026-04-03 07:52:19.1775202739
Solving ODE involving matrices
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