Open-circuit time constant method

In functional analysis, a branch of mathematics, the Goldstine theorem, named after Herman Goldstine, asserts that the image of the closed unit ball ${\displaystyle B_{X}}$ of a Banach space ${\displaystyle X}$ under the canonical imbedding into the closed unit ball ${\displaystyle B_{X^{**}}}$ of the bidual space ${\displaystyle X^{**}}$ is weakly*-dense.

The conclusion of the theorem is not true for the norm topology, which can be seen by considering the Banach space of real sequences that converge to zero c₀, and its bi-dual space ℓ_∞.

Proof

Given an ${\displaystyle x^{**}\in B_{X^{**}}}$, a tuple ${\displaystyle (\phi _{1},\dots ,\phi _{n})}$ of linearly independent elements of ${\displaystyle X^{*}}$ and a ${\displaystyle \delta >0}$ we shall find an ${\displaystyle x\in (1+\delta )B_{X}}$ such that ${\displaystyle \phi _{i}(x)=x^{**}(\phi _{i})}$ for every ${\displaystyle i=1,\dots ,n}$.

If the requirement ${\displaystyle \|x\|\leq 1+\delta }$ is dropped, the existence of such an ${\displaystyle x}$ follows from the surjectivity of

${\displaystyle \Phi :X\to \mathbb {C} ^{n},x\mapsto (\phi _{1}(x),\dots ,\phi _{n}(x)).}$

Let now ${\displaystyle Y:=\bigcap _{i}\ker \phi _{i}=\ker \Phi }$. Every element of ${\displaystyle (x+Y)\cap (1+\delta )B_{X}}$ has the required property, so that it suffices to show that the latter set is not empty.

Assume that it is empty. Then ${\displaystyle \mathrm {dist} (x,Y)\geq 1+\delta }$ and by the Hahn-Banach theorem there exists a linear form ${\displaystyle \phi \in X^{*}}$ such that ${\displaystyle \phi |_{Y}=0}$, ${\displaystyle \phi (x)\geq 1+\delta }$ and ${\displaystyle \|\phi \|_{X^{*}}=1}$. Then ${\displaystyle \phi \in \mathrm {span} (\phi _{1},\dots ,\phi _{n})}$ and therefore

${\displaystyle 1+\delta \leq \phi (x)=x^{**}(\phi )\leq \|\phi \|_{X^{*}}\|x^{**}\|_{X^{**}}\leq 1,}$

which is a contradiction.

See also

• Banach–Alaoglu theorem
• Bishop–Phelps theorem
• Eberlein–Šmulian theorem
• Mazur's lemma
• James' theorem

Template:Functional Analysis

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