Dixmier–Ng theorem

In functional analysis, the Dixmier–Ng theorem is a characterization of when a normed space is in fact a dual Banach space. It was proven by Kung-fu Ng, who called it a variant of a theorem proven earlier by Jacques Dixmier.^[1]^[2]

Dixmier-Ng theorem.^[1] Let

X

be a normed space. The following are equivalent:

There exists a Hausdorff locally convex topology $\tau$ on $X$ so that the closed unit ball, $\mathbf {B} _{X}$ , of $X$ is $\tau$ -compact.
There exists a Banach space $Y$ so that $X$ is isometrically isomorphic to the dual of $Y$ .

That 2. implies 1. is an application of the Banach–Alaoglu theorem, setting $\tau$ to the Weak-* topology. That 1. implies 2. is an application of the Bipolar theorem.

Applications[edit]

Let $M$ be a pointed metric space with distinguished point denoted $0_{M}$ . The Dixmier-Ng Theorem is applied to show that the Lipschitz space ${\text{Lip}}_{0}(M)$ of all real-valued Lipschitz functions from $M$ to $\mathbb {R}$ that vanish at $0_{M}$ (endowed with the Lipschitz constant as norm) is a dual Banach space.^[3]

References[edit]

^ ^a ^b Ng, Kung-fu (December 1971), "On a theorem of Dixmier", Mathematica Scandinavica, 29: 279–280, doi:10.7146/math.scand.a-11054
^ Dixmier, J. (December 1948), "Sur un théorème de Banach", Duke Mathematical Journal, 15 (4): 1057–1071, doi:10.1215/s0012-7094-48-01595-6
^ Godefroy, G.; Kalton, N. J. (2003), "Lipschitz-free Banach spaces", Studia Mathematica, 159 (1): 121–141, doi:10.4064/sm159-1-6

[ng-1] Ng, Kung-fu (December 1971), "On a theorem of Dixmier", Mathematica Scandinavica, 29: 279–280, doi:10.7146/math.scand.a-11054

[2] Dixmier, J. (December 1948), "Sur un théorème de Banach", Duke Mathematical Journal, 15 (4): 1057–1071, doi:10.1215/s0012-7094-48-01595-6

[3] Godefroy, G.; Kalton, N. J. (2003), "Lipschitz-free Banach spaces", Studia Mathematica, 159 (1): 121–141, doi:10.4064/sm159-1-6

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