Self-adjoint: Difference between revisions

Template:Short description In mathematics, an element of a *-algebra is called self-adjoint if it is the same as its adjoint (i.e. ${\displaystyle a=a^{*}}$).

Let ${\displaystyle 𝒜}$ be a *-algebra. An element ${\displaystyle a\in 𝒜}$ is called self-adjoint if Template:Nowrap

The set of self-adjoint elements is referred to as Template:Nowrap

A subset ${\displaystyle ℬ\subseteq 𝒜}$ that is closed under the involution *, i.e. ${\displaystyle ℬ={ℬ}^{*}}$, is called Template:Nowrap

A special case of 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.

Especially in the older literature on *-algebras and C*-algebras, such elements are often called Template:Nowrap Because of that the notations ${\displaystyle {𝒜}_h}$, ${\displaystyle {𝒜}_H}$ or ${\displaystyle H(𝒜)}$ for the set of self-adjoint elements are also sometimes used, even in the more recent literature.

• Each positive element of a C*-algebra is Template:Nowrap
• For each element ${\displaystyle a}$ of a *-algebra, the elements ${\displaystyle a{a}^{*}}$ and ${\displaystyle a^{*}a}$ are self-adjoint, since * is an Template:Nowrap
• For each element ${\displaystyle a}$ of a *-algebra, the real and imaginary parts $\mathrm{Re}(a)=\frac{1}{2}(a+a^{*})$ and $\mathrm{Im}(a)=\frac{1}{2\mathrm{i}}(a-a^{*})$ are self-adjoint, where ${\displaystyle \mathrm{i}}$ denotes the Template:Nowrap
• If ${\displaystyle a\in {𝒜}_N}$ is a normal element of a C*-algebra ${\displaystyle 𝒜}$, then for every real-valued function ${\displaystyle f}$, which is continuous on the spectrum of ${\displaystyle a}$, the continuous functional calculus defines a self-adjoint element Template:Nowrap

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

• Let ${\displaystyle a\in 𝒜}$, then ${\displaystyle a^{*}a}$ is self-adjoint, since ${\displaystyle (a^{*}a{)}^{*}=a^{*}(a^{*}{)}^{*}=a^{*}a}$. A similarly calculation yields that ${\displaystyle a{a}^{*}}$ is also Template:Nowrap
• Let ${\displaystyle a=a_1{a}_2}$ be the product of two self-adjoint elements Template:Nowrap Then ${\displaystyle a}$ is self-adjoint if ${\displaystyle a_1}$ and ${\displaystyle a_2}$ commutate, since ${\displaystyle (a_1{a}_2{)}^{*}=a_2^{*}{a}_1^{*}=a_2{a}_1}$ always Template:Nowrap
• If ${\displaystyle 𝒜}$ is a C*-algebra, then a normal element ${\displaystyle a\in {𝒜}_N}$ is self-adjoint if and only if its spectrum is real, i.e. Template:Nowrap

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

• Each element ${\displaystyle a\in 𝒜}$ can be uniquely decomposed into real and imaginary parts, i.e. there are uniquely determined elements ${\displaystyle a_1,a_2\in {𝒜}_{sa}}$, so that ${\displaystyle a=a_1+\mathrm{i}{a}_2}$ holds. Where $a_1=\frac{1}{2}(a+a^{*})$ and Template:Nowrap
• The set of self-adjoint elements ${\displaystyle {𝒜}_{sa}}$ is a real linear subspace of Template:Nowrap From the previous property, it follows that ${\displaystyle 𝒜}$ is the direct sum of two real linear subspaces, i.e. Template:Nowrap
• If ${\displaystyle a\in {𝒜}_{sa}}$ is self-adjoint, then ${\displaystyle a}$ is Template:Nowrap
• The *-algebra ${\displaystyle 𝒜}$ is called a hermitian *-algebra if every self-adjoint element ${\displaystyle a\in {𝒜}_{sa}}$ has a real spectrum Template:Nowrap

Let ${\displaystyle 𝒜}$ be a C*-algebra and ${\displaystyle a\in {𝒜}_{sa}}$. Then:

• For the spectrum ${\displaystyle \Vert a\Vert \in \sigma (a)}$ or ${\displaystyle -\Vert a\Vert \in \sigma (a)}$ holds, since ${\displaystyle \sigma (a)}$ is real and ${\displaystyle r(a)=\Vert a\Vert }$ holds for the spectral radius, because ${\displaystyle a}$ is Template:Nowrap
• According to the continuous functional calculus, there exist uniquely determined positive elements ${\displaystyle a_{+},a_{-}\in {𝒜}_{+}}$, such that ${\displaystyle a=a_{+}-a_{-}}$ with Template:Nowrap For the norm, ${\displaystyle \Vert a\Vert =\max (\Vert a_{+}\Vert ,\Vert a_{-}\Vert )}$ holds.Template:Sfn The elements ${\displaystyle a_{+}}$ and ${\displaystyle a_{-}}$ are also referred to as the positive and negative parts. In addition, ${\displaystyle |a|=a_{+}+a_{-}}$ holds for the absolute value defined for every element Template:Nowrap
• For every ${\displaystyle a\in {𝒜}_{+}}$ and odd ${\displaystyle n\in \mathbb{N}}$, there exists a uniquely determined ${\displaystyle b\in {𝒜}_{+}}$ that satisfies ${\displaystyle b^n=a}$, i.e. a unique ${\displaystyle n}$-th root, as can be shown with the continuous functional Template:Nowrap

• Self-adjoint matrix
• Self-adjoint operator

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