Compound matrix

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In mathematics, the kth compound matrix (sometimes referred to as the kth multiplicative compound matrix) ${\displaystyle C_{k}(A)}$,^[1] of an ${\displaystyle m\times n}$ matrix A is the ${\displaystyle {\binom {m}{k}}\times {\binom {n}{k}}}$ matrix formed from the determinants of all ${\displaystyle k\times k}$ submatrices of A, i.e., all ${\displaystyle k\times k}$ minors, arranged with the submatrix index sets in lexicographic order. The following properties hold:

${\displaystyle {\begin{aligned}C_{1}(A)&=A\\[6pt]C_{n}(A)&=\det(A){\text{ if }}A{\text{ is }}n\times n\\[6pt]C_{k}(AB)&=C_{k}(A)C_{k}(B)\\[6pt]C_{k}(aX)&=a^{k}C_{k}(X)\\[6pt]{\text{For }}n\times n{\text{ identity }}I,C_{k}(I)&=I\,,{\text{ the }}\textstyle {{\binom {n}{k}}\times {\binom {n}{k}}}{\text{ identity }}\\[6pt]C_{k}(A^{T})&=C_{k}(A)^{T}\,,{\text{ over any field}}\\[6pt]C_{k}(A^{*})&=C_{k}(A)^{*}\,,{\text{ over }}\mathbb {C} \\[6pt]C_{k}(A^{-1})&=C_{k}(A)^{-1}\,,{\text{ for }}n\times n,{\text{ invertible }}A\end{aligned}}}$

If ${\displaystyle A}$ is viewed as the matrix of an operator in a basis ${\displaystyle (e_{1},\dots ,e_{n})}$ then the compound matrix ${\displaystyle C_{k}(A)}$ is the matrix of the ${\displaystyle k}$-th exterior power ${\displaystyle A^{\wedge k}}$ in the basis ${\displaystyle (e_{i_{1}}\wedge \dots \wedge e_{i_{k}})_{i_{1}<\dots <i_{k}}}$. In this formulation, the multiplicativity property ${\displaystyle C_{k}(AB)=C_{k}(A)C_{k}(B)}$ is equivalent to the functoriality of the exterior power. ^[2]

• Gantmacher, F. R. and Krein, M. G., Oscillation Matrices and Kernels and Small Vibrations of Mechanical Systems, Revised Edition, http://www.ams.org/bookstore?fn=20&arg1=diffequ&ikey=CHEL-345-H
• To efficiently calculate compound matrices see: "Compound matrices: properties, numerical issues and analytical computations" - Christos Kravvaritis · Marilena Mitrouli - DOI 10.1007/s11075-008-9222-7