Normal element

In mathematics, an element of a *-algebra is called normal if it commutates with its adjoint.^[1]

Let ${\displaystyle {𝒜}}$ be a *-Algebra. An element ${\displaystyle a\in {𝒜}}$ is called normal if it commutates with ${\displaystyle a^{*}}$, i.e. it satisfies the equation ${\displaystyle a{a}^{*}=a^{*}a}$.^[1]

The set of normal elements is denoted by ${\displaystyle {{𝒜}}_N}$ or ${\displaystyle N({𝒜})}$.

A special case from particular importance is the case where ${\displaystyle {𝒜}}$ is a complete normed *-algebra, that satisfies the C*-identity (${\displaystyle \Vert a^{*}a\Vert ={\Vert a\Vert }^2\mathrm{\forall }a\in {𝒜}}$), which is called a C*-algebra.

• Every self-adjoint element of a a *-algebra is normal.^[1]
• Every unitary element of a a *-algebra is normal.^[2]
• If ${\displaystyle {𝒜}}$ is a C*-Algebra and ${\displaystyle a\in {{𝒜}}_N}$ a normal element, then for every continuous function ${\displaystyle f}$ on the spectrum of ${\displaystyle a}$ the continuous functional calculus defines another normal element ${\displaystyle f(a)}$.^[3]

Let ${\displaystyle {𝒜}}$ be a *-algebra. Then:

• An element ${\displaystyle a\in {𝒜}}$ is normal if and only if the *-subalgebra generated by ${\displaystyle a}$, meaning the smallest *-algebra containing ${\displaystyle a}$, is commutative.^[2]
• Every element ${\displaystyle a\in {𝒜}}$ can be uniquely decomposed into a real and imaginary part, which means there exist self-adjoint elements ${\displaystyle a_1,a_2\in {{𝒜}}_{sa}}$, such that ${\displaystyle a=a_1+\mathrm{i}{a}_2}$, where ${\displaystyle \mathrm{i}}$ denotes the imaginary unit. Exactly then ${\displaystyle a}$ is normal if ${\displaystyle a_1{a}_2=a_2{a}_1}$, i.e. real and imaginary part commutate.^[1]

Let ${\displaystyle a\in {{𝒜}}_N}$ be a normal element of a *-algebra ${\displaystyle {𝒜}}$. Then:

• The adjoint element ${\displaystyle a^{*}}$ is also normal, since ${\displaystyle a=(a^{*}{)}^{*}}$ holds for the involution *.^[4]

Let ${\displaystyle a\in {{𝒜}}_N}$ be a normal element of a C*-algebra ${\displaystyle {𝒜}}$. Then:

• It is ${\displaystyle \Vert a^2\Vert ={\Vert a\Vert }^2}$, since for normal elements using the C*-identity ${\displaystyle {\Vert a^2\Vert }^2=\Vert (a^2)(a^2{)}^{*}\Vert =\Vert (a^{*}a{)}^{*}(a^{*}a)\Vert ={\Vert a^{*}a\Vert }^2={\left({\Vert a\Vert }^2\right)}^2}$ holds.^[5]
• Every normal element is a normaloid element, i.e. the spectral radius ${\displaystyle r(a)}$ equals the norm of ${\displaystyle a}$, i.e. ${\displaystyle r(a)=\Vert a\Vert }$.^[6] This follows from the spectral radius formula by repeated application of the previous property.^[7]
• A continuous functional calculus can be developed which – put simply – allows the application of continuous functions on the spectrum of ${\displaystyle a}$ to ${\displaystyle a}$.^[3]

• Normal matrix
• Normal operator

• Dixmier, Jacques (1977). C*-algebras. Amsterdam/New York/Oxford: North-Holland. ISBN 0-7204-0762-1.  English translation of Dixmier, Jacques (1969) (in fr). Les C*-algèbres et leurs représentations. Gauthier-Villars. 
• Heuser, Harro (1982). Functional analysis. John Wiley & Sons Ltd.. ISBN 0-471-10069-2. 
• Werner, Dirk (2018) (in de). Funktionalanalysis (8 ed.). Springer. ISBN 978-3-662-55407-4. 

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