Dual space of C 0(x) vs C b(x)

Introduction

In the case that the space ${\displaystyle X}$ is compact then all continuous functions belongs to ${\displaystyle C_{0}(X)}$ as we will show in the next section. On the other hand if the space ${\displaystyle X}$ is not compact while we always have the inclusion ${\displaystyle C(X)\supseteq C_{0}(X)}$ there may be some continuous function that do not belong to ${\displaystyle C_{0}(X)}$. Some of them may even even be bounded and still not belong to ${\displaystyle C_{0}(X)}$, this motivates us to consider the dual space of ${\displaystyle C_{0}(X)}$ and the dual space of ${\displaystyle C_{b}(X)}$.

Background and Statement

Let ${\displaystyle C_{0}(X)=\{f\in C(X){\text{ and }}\forall \epsilon >0{\text{ }}\exists {\text{ a compact set}}K\subset X{\text{ s.t. }}\mid f(x)\mid <\epsilon {\text{ }}\forall x\in X\setminus K\}}$ equipped with the sup norm. In other words this is the space of continuous function vanishing at infinity. Note that in the case ${\displaystyle X}$ is compact we can choose ${\displaystyle K=X}$ in the previous definition, since properties on the empty set are trivially true, we can conclude that ${\displaystyle C(X)=C_{0}(X)}$. Let ${\displaystyle C_{b}(X)}$ be the space of bounded continuous functions on ${\displaystyle X}$ together with the sup norm, Again in the case ${\displaystyle X}$ is compact we have not introduced a new space since every continuous function on a compact metric space is bounded, to see this assume on the contrary that there is a sequence ${\displaystyle \{x_{n}\}_{n\in \mathbb {N} }}$ such that ${\displaystyle |f(x_{n})|\rightarrow \infty }$ as ${\displaystyle n\rightarrow \infty }$. I can then extract by compactness a sub sequence ${\displaystyle \{x_{n_{k}}\}_{i\in \mathbb {N} }}$ converging to a point ${\displaystyle {\hat {x}}\in X}$. Therefore by continuity of ${\displaystyle f}$ we have ${\displaystyle |f(x_{n_{k}})|\rightarrow |f({\hat {x}})|<\infty }$, and this is our desired contradiction. We conclude that ${\displaystyle C(X)=C_{b}(X)=C_{0}(X)}$.

The rest of this discussion will consider the case where ${\displaystyle X}$ is not compact. We wont have the last chain of equalities but only the inequalities ${\displaystyle C(X)\supset C_{b}(X)\supset C_{0}(X)}$

The case of ${\displaystyle C_{0}(X)'}$

The representation of the dual space of ${\displaystyle C_{0}(X)}$ is a described by the following well known result in Functional Analysis (Riesz Representation Theorem 6.19 in Rudin ^[1]):

Let ${\displaystyle X}$ be a locally compact Hausdorff space, for any bounded linear function ${\displaystyle \phi }$, i.e. an element of the dual space ${\displaystyle C_{0}(X)'}$, there is a unique complex Borel measure ${\displaystyle \mu }$ such that the following holds:

${\displaystyle <\phi ,f>=\int _{X}fd\mu ,{\text{ for every }}f\in C_{0}(X)}$.

This allows us to identify ${\displaystyle C_{0}(X)'}$ with ${\displaystyle {\mathcal {M}}(X)}$, space of complex Borel measures. Moreover we can endow ${\displaystyle C_{0}(X)'}$ with the total variation norm: ${\displaystyle \|\phi \|=|\mu |(X)}$.

The case of ${\displaystyle C_{b}(X)'}$

To descrive the dual space of ${\displaystyle C_{b}(X)}$, I will focus my attention to only one property of functions which is the behavior at infinity. First we need a preliminary result: ${\displaystyle C_{0}(X)}$ is a closed (vector) subspace of ${\displaystyle C_{b}(X)}$. In other words ${\displaystyle C_{0}(X)}$ contains all its limit points. Let ${\displaystyle f_{n}(x)}$ be a convergent sequence in ${\displaystyle C_{0}(X)'}$, ${\displaystyle f_{n}(x)}$ are continuous functions vanishing at infinity and let ${\displaystyle f(x)}$ their limit. f is continuous since the uniform norm we are using provides uniform convergence. It remains to show that such limit ${\displaystyle f(x)}$ vanishes at infinity: let ${\displaystyle n\in \mathbb {N} }$ be such that ${\displaystyle \|f-f_{n}\|_{\infty }<\epsilon /2}$, now since each ${\displaystyle f_{n}(x)}$ vanishes at infinity, we can find ${\displaystyle K_{n}\subset X}$ such that ${\displaystyle |f_{n}(x)|<\epsilon /2}$ for any ${\displaystyle x\in X\setminus K_{n}}$. Then we can conclude by triangle inequality that

${\displaystyle |f(x)|\leq |f(x)-f_{n}(x)|+|f_{n}(x)|<\epsilon }$,

We want now to investigate the properties of elements of the dual space of ${\displaystyle C_{b}(X)}$, not by looking at local properties but rather a very property condition on the limit at infinity of our elements of ${\displaystyle C_{b}(X)}$, it turns out that this allow us to extract also global information on the whole ${\displaystyle C_{b}(X)}$.

We say that a function ${\displaystyle u\in C_{b}(X)}$ admits a limit at infinity ${\displaystyle u(\infty )}$ if for any ${\displaystyle \epsilon >0}$ there exists a compact ${\displaystyle K_{\epsilon }\subset X}$ such that if ${\displaystyle x\notin K_{\epsilon }}$ implies ${\displaystyle |u(x)-u(\infty )|\leq \epsilon }$. We can see this operation as a linear function 'limit at infinity' thanks to Hahn-Banach we can build a continuous extension of it for all ${\displaystyle C_{b}(X)}$. This is another spectacular consequence of Axiom of Choice (Hahn-Banach theorem in this case) since the extension assign a limit to any continuous bounded function!

Kantorovich Duality for ${\displaystyle C_{b}(X\times Y)}$

As it can be found in Villani, Proposition 1.22 ^[2] also [1], the following version of Kantorovich duality holds: let ${\displaystyle X}$ and ${\displaystyle Y}$ locally compact Polish spaces, let ${\displaystyle c}$ be a lower semi-continuous non negative function on ${\displaystyle X\times Y}$ and let ${\displaystyle \mu }$ and ${\displaystyle \nu }$ be two Borel probability measures on ${\displaystyle X\times Y}$ respectively then:

${\displaystyle \inf _{\pi \in \Pi (\mu ,\nu )}\int _{X\times Y}c(x,y)d\pi (x,y)=\sup _{(\phi ,\psi )\in \Phi _{c}}\int _{X}\phi d\mu +\int _{X}\psi d\nu }$,

Here ${\displaystyle \Pi (\mu ,\nu )}$ is the set of all probability measures ${\displaystyle \pi }$ that satisfies ${\displaystyle \pi (A\times Y)=\mu (A)}$ and ${\displaystyle \pi (X\times B)=\nu (B)}$ for any measurable set ${\displaystyle A\subset X}$ and any measurable set ${\displaystyle B\subset Y}$; ${\displaystyle \Phi _{c}}$ is the set of all measurable functions ${\displaystyle (\phi ,\psi )\in L^{1}(d\mu )\times L^{1}(d\nu )}$ that satisfies ${\displaystyle \phi (x)+\psi (x)\leq c(x,y)}$ for ${\displaystyle d\mu }$ almost all ${\displaystyle x\in X}$ and for ${\displaystyle d\nu }$ almost all ${\displaystyle y\in Y}$.

If we try to extend the proof of the compact case we run into a problem since the dual of ${\displaystyle C_{b}(X\times Y)}$ strictly contains ${\displaystyle {\mathcal {M}}(X\times Y)}$. If we restrict to the closed subspace ${\displaystyle C_{0}(X\times Y)\subset C_{b}(X\times Y)}$ than any elements ${\displaystyle C_{b}(X\times Y)'}$ acts continuously, and mentioned before, can be represented by a unique ${\displaystyle \pi \in {\mathcal {M}}(X\times Y)}$ such that

${\displaystyle <l,f>=\int _{X\times Y}f(x,y)d\pi ,{\text{ for every }}f\in C_{0}(X\times Y)}$.

We can then write ${\displaystyle l=\pi +R}$ where ${\displaystyle R}$ is a continuous linear functional supported at infinity, i.e. ${\displaystyle \forall f\in C_{0}(X\times Y)}$ implies ${\displaystyle <R,f>=0}$.

For what discussed in the previous section the behavior of some ${\displaystyle R}$ may not be clear at first glance as the following result implies:

let ${\displaystyle \mu }$ and ${\displaystyle \nu }$ be two Borel probability measures on ${\displaystyle X\times Y}$ respectively, there is a continuous linear functional ${\displaystyle l}$ on ${\displaystyle C_{b}(X\times Y)}$, supported at infinity, such that the following holds

${\displaystyle \forall (\phi ,\psi )\in C_{0}(X)\times C_{0}(Y),<l,\phi +\psi >=\int _{X}\phi d\mu +\int _{Y}\psi d\nu }$.

Because