Normal matrices: Difference between revisions

A complex square matrix A is a normal matrix if

${\displaystyle A^{\dagger }A=AA^{\dagger },}$

where ${\displaystyle A^{\dagger }}$ is the conjugate transpose of A. That is, a matrix is normal if it commutes with its conjugate transpose: ${\displaystyle [A,A^{\dagger }]=0}$.

Normal matrices are precisely those to which the spectral theorem applies: a matrix ${\displaystyle A}$ is normal if and only if it can be represented by a diagonal matrix ${\displaystyle \Lambda }$ and a unitary matrix ${\displaystyle U}$ by the formula

${\displaystyle A=U\Lambda U^{\dagger },}$

where

${\displaystyle \Lambda =\mathrm {diag} (\lambda _{1},\lambda _{2},\dots )}$

${\displaystyle U^{\dagger }U=UU^{\dagger }=I.}$

The entries ${\displaystyle \lambda _{i}}$ of the diagonal matrix ${\displaystyle \Lambda }$ are the eigenvalues of ${\displaystyle A}$, and the columns of ${\displaystyle U}$ are the eigenvectors of ${\displaystyle A}$. The matching eigenvalues in ${\displaystyle \Lambda }$ must be ordered as the eigenvectors are ordered as columns of ${\displaystyle U}$.

References[edit]

• Normal matrix entry in Wikipedia