User:IssaRice/Linear algebra/Classification of operators

Let ${\displaystyle V}$ be a finite-dimensional inner product space, and let ${\displaystyle T:V\to V}$ be a linear transformation. Then in the table below, the statements within the same row are equivalent. Below, we consider only complex operators, or the complexification of a real operator.

Operator kind	Description in terms of eigenvectors	Description in terms of diagonalizability	Geometric interpretation	Algebraic property	Notes	Examples
${\displaystyle T}$ is diagonalizable	There exists a basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$	${\displaystyle T}$ is diagonalizable (there exists a basis ${\displaystyle \beta }$ of ${\displaystyle V}$ with respect to which ${\displaystyle [T]_{\beta }^{\beta }}$ is a diagonal matrix)			This basis is not unique because we can reorder the vectors and also scale eigenvectors by a non-zero number to obtain an eigenvector. But there are at most ${\displaystyle \dim V}$ distinct eigenvalues so the diagonal matrix should be unique up to order? This result holds even if ${\displaystyle V}$ is merely a vector space with any field of scalars.	If ${\displaystyle T}$ is the identity map, then every non-zero vector ${\displaystyle v\in V}$ is an eigenvector of ${\displaystyle T}$ with eigenvalue ${\displaystyle 1}$ because ${\displaystyle Tv=1v}$. Thus every basis ${\displaystyle \beta =(v_{1},\ldots ,v_{n})}$ diagonalizes ${\displaystyle T}$. The matrix of ${\displaystyle T}$ with respect to ${\displaystyle \beta }$ is the identity matrix.
${\displaystyle T}$ is normal	There exists an orthonormal basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$	${\displaystyle T}$ is diagonalizable using an orthonormal basis		${\displaystyle TT^{*}=T^{*}T}$
${\displaystyle T}$ self-adjoint (${\displaystyle T}$ is Hermitian)	There exists an orthonormal basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$ with real eigenvalues	${\displaystyle T}$ is diagonalizable using an orthonormal basis and the diagonal entries are all real		${\displaystyle T=T^{*}}$
${\displaystyle T}$ is anti-self-adjoint	There exists an orthonormal basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$ with pure imaginary eigenvalues	${\displaystyle T}$ is diagonalizable using an orthonormal basis and the diagonal entries are all pure imaginary		${\displaystyle T^{*}=-T}$
${\displaystyle T}$ is an isometry (aka, unitary in a complex vector space, or orthogonal in a real vector space)	There exists an orthonormal basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$ whose eigenvalues all have absolute value 1	${\displaystyle T}$ is diagonalizable using an orthonormal basis and the diagonal entries all have absolute values 1		${\displaystyle TT^{*}=T^{*}T=TT^{-1}=I}$	This only works when the field of scalars is the complex numbers
${\displaystyle T}$ is positive (positive semidefinite)	There exists an orthonormal basis of ${\displaystyle V}$ consisting of eigenvectors of ${\displaystyle T}$ with nonnegative real eigenvalues	${\displaystyle T}$ is diagonalizable using an orthonormal basis and the diagonal entries are all nonnegative real numbers	Polar decomposition says an arbitrary linear operator can be written as a positive operator followed by a rotation (isometry). In polar decomposition, the positive operator step chooses orthogonal directions in which to stretch or shrink, so that we have a tilted ellipse, and the isometry rotates that ellipse. So a positive operator is simply one that does not require the second step. In other words, for a positive operator you can find some orthogonal "coordinate axes" along which to scale.