G.3 EIGENDECOMPOSITION
In this section, we consider a particular type of matrix decomposition known as an eigendecomposition that is a useful representation for studying the properties of a linear system. Other types of matrix decompositions are summarized in Section G.4. Since an eigendecomposition yields a diagonal matrix, it is also referred to as the diagonal form of A.
Definition: Eigenvalues and Eigenvectors An eigenvalue λ of square matrix 
satisfies the following system of equations:
for nonzero vector q called an eigenvector.
Observe that (G.15) can be rewritten as 
, showing that q lies in the null space of 
. The eigenvalues are the specific λs such that this null space is nonempty, which means 
is a singular matrix. Since the determinant of a singular matrix is zero, we can find the eigenvalues by solving the following characteristic equation:
It is straightforward ...
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