You need to see T as an element of \mathbb R^2 \otimes \mathbb {R^2}^* for the right order of indices. In a matrix of a linear operator the first index corresponds to the target space (column ...

Notice that PA = (A^TP)^T and, denoting the blocks of P as P_{ij} for i=1,2, j = 1,2, A^TP = \begin{bmatrix} 0 & -K_v \\ {\rm I}_n & -K_p \end{bmatrix} \begin{bmatrix} P_{11} & P_{12} \\ P_{12}^T & P_{22} \end{bmatrix} = \begin{bmatrix} -K_v P_{12}^T & -K_v P_{22} \\ P_{11} - K_p P_{12}^T & P_{12} - K_p P_{22} \end{bmatrix}. ...

We have a correspondence \begin{pmatrix}\color{Magenta}{a} \\ \color{Magenta}{b} \\ \color{Magenta}{c}\end{pmatrix} \otimes \begin{pmatrix}\color{Blue}{x} & \color{Blue}{y} & \color{Blue}{z}\end{pmatrix} \quad\longleftrightarrow\quad\begin{pmatrix} \color{Magenta}{a} \color{Blue}{x} & \color{Magenta}{a} \color{Blue}{y} & \color{Magenta}{a} \color{Blue}{z} \\ \color{Magenta}{b} \color{Blue}{x} & \color{Magenta}{b} \color{Blue}{y} & \color{Magenta}{b} \color{Blue}{z} \\ \color{Magenta}{c} \color{Blue}{x} & \color{Magenta}{c} \color{Blue}{y} & \color{Magenta}{c} \color{Blue}{z} \end{pmatrix} ...

If you know what the Kronecker delta \delta_{ij} and the Levi-Civita symbol \epsilon_{ijk} are, there's an even simpler method than that presented by Kelechi Nze above/below. If this is your ...

An extended discussion of where you're going wrong with a hint at the end : Composition of paths is not the same as composition of functions. You have a function h: X \rightarrow Y. That is, it ...

Let f\colon G\to H be a homomorphism of Lie groups as in the question. Via the natural group isomorphism, we can consider \DeclareMathOperator{\im}{im}\im(f) as G/\ker(f). Since \ker(f)\subset G ...