Babuška–Lax–Milgram theorem

In functional analysis, a branch of mathematics, the Shilov boundary is the smallest closed subset of the structure space of a commutative Banach algebra where an analog of the maximum modulus principle holds. It is named after its discoverer, Georgii Evgen'evich Shilov.

Precise definition and existence

Let ${\displaystyle \mathcal{𝒜}}$ be a commutative Banach algebra and let ${\displaystyle \mathrm{\Delta }\mathcal{𝒜}}$ be its structure space equipped with the relative weak*-topology of the dual ${\displaystyle {\mathcal{𝒜}}^{*}}$. A closed (in this topology) subset ${\displaystyle F}$ of ${\displaystyle \mathrm{\Delta }\mathcal{𝒜}}$ is called a boundary of ${\displaystyle \mathcal{𝒜}}$ if ${\displaystyle {\max }_{f\in \mathrm{\Delta }\mathcal{𝒜}}|x(f)|={\max }_{f\in F}|x(f)|}$ for all ${\displaystyle x\in \mathcal{𝒜}}$. The set ${\displaystyle S=\bigcap \{F:F\text{ is a boundary of }\mathcal{𝒜}\}}$ is called the Shilov boundary. It has been proved by Shilov^[1] that ${\displaystyle S}$ is a boundary of ${\displaystyle \mathcal{𝒜}}$.

Thus one may also say that Shilov boundary is the unique set ${\displaystyle S\subset \mathrm{\Delta }\mathcal{𝒜}}$ which satisfies

1. ${\displaystyle S}$ is a boundary of ${\displaystyle \mathcal{𝒜}}$, and
2. whenever ${\displaystyle F}$ is a boundary of ${\displaystyle \mathcal{𝒜}}$, then ${\displaystyle S\subset F}$.

Examples

• Let ${\displaystyle \mathbb{𝔻}=\{z\in \mathbb{ℂ}:|z|<1\}}$ be the open unit disc in the complex plane and let

${\displaystyle \mathcal{𝒜}}=\mathcal{\mathscr{H}}(\mathbb{𝔻})\cap \mathcal{𝒞}(\overline{\mathbb{𝔻}})$ be the disc algebra, i.e. the functions holomorphic in ${\displaystyle \mathbb{𝔻}}$ and continuous in the closure of ${\displaystyle \mathbb{𝔻}}$ with supremum norm and usual algebraic operations. Then ${\displaystyle \mathrm{\Delta }\mathcal{𝒜}=\overline{\mathbb{𝔻}}}$ and ${\displaystyle S=\{|z|=1\}}$.

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See also

• James boundary