closed ideals in $C^{*}$ -algebras are self-adjoint

Theorem - Every closed (http://planetmath.org/ClosedSet) two-sided ideal (http://planetmath.org/IdealOfAnAlgebra) $\mathcal{I}$ of a $C^{*}$ -algebra (http://planetmath.org/CAlgebra) $\mathcal{A}$ is self-adjoint (http://planetmath.org/InvolutaryRing), i.e.

if $x\in\mathcal{I}$ then $x^{*}\in\mathcal{I}$ .

Proof : Let $\mathcal{I}^{*}:=\{a^{*}:a\in\mathcal{I}\}$ .

Since $\mathcal{I}$ is closed and the involution mapping is continuous, it follows that $\mathcal{I}^{*}$ is also closed.

We claim that $\mathcal{I}^{*}$ is also a of $\mathcal{A}$ . To see this let $a,b\in\mathcal{I}$ , $x\in\mathcal{A}$ and $\lambda\in\mathbb{C}$ . Then

•

$a^{*}+\lambda b^{*}=(a+\overline{\lambda}b)^{*}\in\mathcal{I}^{*}$ since $a+\overline{\lambda}b\in\mathcal{I}$
•

$xa^{*}=(ax^{*})^{*}\in\mathcal{I}^{*}$ since $ax^{*}\in\mathcal{I}$ .
•

$a^{*}x=(x^{*}a)^{*}\in\mathcal{I}^{*}$ since $x^{*}a\in\mathcal{I}$

Let $\mathcal{B}:=\mathcal{I}\cap\mathcal{I}^{*}$ .

$\mathcal{B}$ is a $C^{*}$ -subalgebra of $\mathcal{A}$ (it is a norm-closed, involution-closed, subalgebra of $\mathcal{A}$ ).

It is known that every $C^{*}$ -algebra has an approximate identity consisting of positive elements with norm less than $1$ (see this entry (http://planetmath.org/CAlgebrasHaveApproximateIdentities)).

Let $(e_{\lambda})_{\lambda\in\Lambda}$ be an approximate identity for $\mathcal{B}$ with the above :

1.

each $e_{\lambda}$ is positive (hence self-adjoint) and
2.

$\|e_{\lambda}\|\leq 1\;\;\;\forall_{\lambda\in\Lambda}$

We now prove $\mathcal{I}$ is self-adjoint:

Let $a\in\mathcal{I}$ . We have that

$\displaystyle\\|a^{}-a^{}e_{\lambda}\\|^{2}$	$\displaystyle=$	$\displaystyle\\|(a^{}-a^{}e_{\lambda})^{}\cdot(a^{}-a^{*}e_{\lambda})\\|$
	$\displaystyle=$	$\displaystyle\\|(a-e_{\lambda}a)\cdot(a^{}-a^{}e_{\lambda})\\|$
	$\displaystyle=$	$\displaystyle\\|(aa^{}-aa^{}e_{\lambda})-e_{\lambda}(aa^{}-aa^{}e_{\lambda})\\|$
	$\displaystyle\leq$	$\displaystyle\\|aa^{}-aa^{}e_{\lambda}\\|+\\|e_{\lambda}\\|\cdot\\|aa^{}-aa^{}e% _{\lambda}\\|$
	$\displaystyle\leq$	$\displaystyle\\|aa^{}-aa^{}e_{\lambda}\\|+\\|aa^{}-aa^{}e_{\lambda}\\|$
	$\displaystyle=$	$\displaystyle 2\\|aa^{}-aa^{}e_{\lambda}\\|$

Taking limits in both we obtain

\lim_{\lambda}\|a^{*}-a^{*}e_{\lambda}\|^{2}\leq\lim_{\lambda}\;2\|aa^{*}-aa^{% *}e_{\lambda}\|=0

since $aa^{*}\in\mathcal{I}\cap\mathcal{I}^{*}=\mathcal{B}$ and $(e_{\lambda})_{\lambda\in\Lambda}$ is an approximate identity for $\mathcal{B}$ .

As $e_{\lambda}\in\mathcal{I}$ we see that $a^{*}e_{\lambda}\in\mathcal{I}$ .

We conclude from the limit above that $a^{*}$ is in the closure of $\mathcal{I}$ . Therefore $a^{*}\in\mathcal{I}$ .

Hence, $\mathcal{I}$ is self-adjoint. $\square$

Title	closed ideals in $C^{*}$ -algebras are self-adjoint
Canonical name	ClosedIdealsInCalgebrasAreSelfadjoint
Date of creation	2013-03-22 17:30:42
Last modified on	2013-03-22 17:30:42
Owner	asteroid (17536)
Last modified by	asteroid (17536)
Numerical id	9
Author	asteroid (17536)
Entry type	Theorem
Classification	msc 46L05
Classification	msc 46H10

$\displaystyle\\|a^{}-a^{}e_{\lambda}\\|^{2}$	$\displaystyle=$	$\displaystyle\\|(a^{}-a^{}e_{\lambda})^{}\cdot(a^{}-a^{*}e_{\lambda})\\|$
	$\displaystyle=$	$\displaystyle\\|(a-e_{\lambda}a)\cdot(a^{}-a^{}e_{\lambda})\\|$
	$\displaystyle=$	$\displaystyle\\|(aa^{}-aa^{}e_{\lambda})-e_{\lambda}(aa^{}-aa^{}e_{\lambda})\\|$
	$\displaystyle\leq$	$\displaystyle\\|aa^{}-aa^{}e_{\lambda}\\|+\\|e_{\lambda}\\|\cdot\\|aa^{}-aa^{}e% _{\lambda}\\|$
	$\displaystyle\leq$	$\displaystyle\\|aa^{}-aa^{}e_{\lambda}\\|+\\|aa^{}-aa^{}e_{\lambda}\\|$
	$\displaystyle=$	$\displaystyle 2\\|aa^{}-aa^{}e_{\lambda}\\|$

closed ideals in C*-algebras are self-adjoint

closed ideals in $C^{*}$ -algebras are self-adjoint