Convergence of Measures and Metrizability: Difference between revisions

This article should address metrizability for both narrow and wide convergence.

General Functional Analysis Refs

• Ambrosio, Gigli, Savaré (107-108), Brezis (72-76)

Narrow Convergence

• Unit ball of dual space of ${\displaystyle C_{b}(X)}$ is, in general, not metrizable: [Conway, A Course in Functional Analysis, Theorem 6.6]
• It is metrizable when restricted to probability measures: Ambrosio, Gigli, Savaré (106-108)

Wide Convergence

• On the other hand, if X is a metrizable locally compact space that is σ-compact, then ${\displaystyle C_{0}(X)}$ is separable, [Conway, A Course in Functional Analysis, III. Banach Spaces, exercise 14]

Weak-star Topologies

Given a Banach space ${\displaystyle X}$ and its Banach dual ${\displaystyle X^{*}}$, the dual can be endowed with the weakest topology that makes the evaluation maps at elements of ${\displaystyle X}$ continuous. This is called the weak-star topology relative to ${\displaystyle X}$. By Banach-Alaoglu, the unit ball of ${\displaystyle X^{*}}$ (which we call ${\displaystyle (X^{*})_{1}}$) with the weak-star topology is compact.

In the case where ${\displaystyle X}$ is norm separable, the weak-star topology on the unit ball of ${\displaystyle X^{*}}$ can, in fact, be metrized. Fix a sequence ${\displaystyle \{x_{n}\}_{n=1}^{\infty }}$ that is countable and dense in ${\displaystyle X}$. Define the metric ${\displaystyle d}$ by ${\displaystyle d(\phi ,\psi ):=\sum _{n=0}^{\infty }2^{-n}{\frac {|\phi (x_{n})-\psi (x_{n})|}{1+|\phi (x_{n})-\psi (x_{n})|}}}$. This is a sum of pseudometrics, necessarily convergent because each term is less than or equal to ${\displaystyle 2^{-n}}$, and is nondegenerate because if ${\displaystyle d(\phi ,\psi )=0}$, then ${\displaystyle \phi (x_{n})=\psi (x_{n})}$ for each ${\displaystyle x_{n}}$, which would imply that the continuous functions ${\displaystyle \phi ,\psi }$ agreed on a dense subset of a metric space. The identity map from ${\displaystyle ((X^{*})_{1},w*)}$ to ${\displaystyle ((X^{*})_{1},d)}$ is continuous: choose a net ${\displaystyle (\phi _{\gamma })_{\gamma \in \Gamma }\to \phi }$. Then for each ${\displaystyle \epsilon >0}$, perform the following truncation process: choose a large ${\displaystyle N}$ so that ${\displaystyle \sum _{n=N+1}^{\infty }2^{-n}=2^{-N}<{\frac {\epsilon }{2}}}$. Because ${\displaystyle \phi _{\gamma }\xrightarrow {w*} \phi }$, for each ${\displaystyle n\in \{1,\ldots ,N\}}$, there is some large ${\displaystyle \gamma _{n}}$ such that for all ${\displaystyle \gamma \succeq \gamma _{n}}$, ${\displaystyle |\phi _{\gamma }(x_{n})-\phi (x-n)|<{\frac {\epsilon }{2\cdot N\cdot 2^{-n}}}}$. By the net order axioms, there is some large ${\displaystyle \gamma _{0}\succeq \gamma _{i}\forall i\in \{1,\ldots ,N\}}$. So for each ${\displaystyle \gamma \succeq \gamma _{0}}$, ${\displaystyle d(\phi _{\gamma },\phi )<\sum _{n=1}^{N}{\frac {1}{2N}}+\sum _{n=N+1}^{\infty }2^{-n}<\epsilon }$. Now the identity map between the two spaces is a continuous bijection between a compact and a Hausdorff topological space, and is therefore a homeomorphism. So it metrizes the weak-star topology.

Narrow Convergence

For every finite signed Radon measure ${\displaystyle \mu }$ on a locally compact Hausdorff space ${\displaystyle X}$, there is some element ${\displaystyle f\in C_{0}(X)}$ such that ${\displaystyle \int _{X}f\,d\mu \neq 0}$. Moreover, letting ${\displaystyle |\mu |}$ denote the total variation of the measure, there is a net of functions ${\displaystyle f_{\gamma }\in C_{0}(X)}$ such that ${\displaystyle \int _{X}f_{\gamma }\,d\mu \rightarrow |\mu |}$, and ${\displaystyle \int _{X}f\,d\mu \leq \|f\|_{\infty }|\mu |}$. This means that ${\displaystyle {\mathcal {M}}(X)\hookrightarrow C_{0}(X)^{*}}$, and can be isometrically identified with a subset of the dual. Narrow convergence is weak-star convergence in ${\displaystyle {\mathcal {M}}(X)}$ with respect to ${\displaystyle C_{0}(X)}$: a net of measures ${\displaystyle \mu _{\gamma }}$ converges to ${\displaystyle \mu }$ narrowly if, for every ${\displaystyle f\in C_{0}(X)}$, ${\displaystyle \int _{X}f\,d\mu _{n}\to \int _{X}f\,d\mu }$.