Normal element

In mathematics, an element x of a *-algebra is normal if it satisfies ${\displaystyle xx^{*}=x^{*}x.}$

This definition stems from the definition of a normal linear operator in functional analysis, where a linear operator A from a Hilbert space into itself is called unitary if ${\displaystyle AA^{*}=A^{*}A,}$ where the adjoint of A is A^∗ and the domain of A is the same as that of A^∗. See normal operator for a detailed discussion. If the Hilbert space is finite-dimensional and an orthonormal basis has been chosen, then the operator A is normal if and only if the matrix describing A with respect to this basis is a normal matrix.