Added the Vitali-Hahn-Saks theorem.
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src/measure/measure/fn.tex
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16
src/measure/measure/fn.tex
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\section{The Fréchet-Nikodym Metric}
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\label{section:frechet-nikodym}
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\begin{definition}[Fréchet-Nikodym Metric]
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\label{definition:frechet-nikodym}
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Let $(X, \cm, \mu)$ be a finite measure space, then the \textbf{Fréchet-Nikodym metric} with respect to $\mu$ is the mapping
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\[
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d: \cm \times \cm \to [0, \infty) \quad (A, B) \mapsto \mu(E \Delta B)
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\]
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For each $A, B \in \cm$, $A$ and $B$ are \textbf{essentially equal} if $\mu(E \Delta B) = 0$. The set $\cm$ modulo essential equality is a complete metric space.
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\end{definition}
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\begin{proof}
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By the completeness of $L^1(X, \cm, \mu; \real)$.
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\end{proof}
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@@ -10,3 +10,4 @@
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\input{./lebesgue-stieltjes.tex}
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\input{./product.tex}
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\input{./kolmogorov.tex}
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\input{./fn.tex}
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@@ -35,3 +35,52 @@
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so (1) does not hold.
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\end{proof}
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\begin{definition}[Uniformly Absolutely Continuous]
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\label{definition:u-ac}
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Let $(X, \cm)$ be a measurable space, $\mu$ be a positive measure on $(X, \cm)$, $E$ be a normed space over $K \in \RC$, and $\mathcal{U} \subset M(X, \cm; E)$ be a family of $E$-valued vector measures on $(X, \cm)$, then $\mathcal{U}$ is \textbf{uniformly absolutely continuous} with respect to $\mu$ if for every $\eps > 0$, there exists $\delta > 0$ such that for all $A \in \cm$ with $\mu(A) < \delta$, $\norm{\nu(A)}_E < \eps$ for all $\nu \in \mathcal{U}$.
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\end{definition}
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\begin{theorem}[Vitali-Hahn-Saks]
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\label{theorem:vitali-hahn-saks}
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Let $(X, \cm, \mu)$ be a measurable space, $\mu$ be a positive measure on $(X, \cm)$, $E$ be a normed vector space over $K \in \RC$, and $\seq{\nu_n} \subset M(X, \cm; E)$ be $E$-valued vector measures on $(X, \cm)$ such that:
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\begin{enumerate}[label=(\alph*)]
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\item For each $n \in \natp$, $\nu$ is absolutely continuous with respect to $\mu$.
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\item For each $A \in M(X, \cm; E)$, $\nu(A) = \limv{n}\nu_n(A)$ exists.
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\end{enumerate}
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then
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\begin{enumerate}
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\item $\seq{\nu_n}$ is uniformly absolutely continuous with respect to $\mu$.
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\item The mapping $\nu$ is a $E$-valued vector measure absolutely continuous with respect to $\mu$.
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\end{enumerate}
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\end{theorem}
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\begin{proof}[Proof, {{\cite[Theorem II.2.1]{Yosida}}}. ]
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Let $\cm_0$ be the euivalence classes of essentially equal sets in $\cm$, equipped with the \hyperref[Fréchet-Nikodym metric]{definition:frechet-nikodym} with respect to $\mu$. For each $n \in \natp$, $\nu_n \ll \mu$ by assumption (a), and $\nu_n \in UC(\cm_0; E)$.
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(1): Let $\eps > 0$. For each $N \in \natp$, let
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\[
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A_N = \bracs{A \in \cm_0 \bigg | \sup_{n \ge N}\norm{\nu_n(A) - \nu_N(A)} \le \eps}
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\]
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then since $\seq{\nu_n} \subset UC(\cm_0; E)$, $A_N \subset \cm_0$ is closed. By assumption (b), $\cm_0 = \bigcup_{N \in \natp}A_N$. By the \hyperref[Baire Category Theorem]{theorem:baire}, there exists $N \in \natp$, $A \in \cm_0$, and $\delta > 0$ such that for every $m, n \ge N$ and $B \in \cm_0$ with $\mu(A \Delta B) \le \delta$, $\norm{\nu_m(B) - \nu_n(B)}_E \le \eps$.
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Let $B \in \cm$ with $\mu(B) = \mu(\emptyset \Delta B) \le \delta$ and write $B = (A \cup B) \setminus (A \setminus B)$, then $\mu((A \cup B) \Delta B) \le \delta$ and $\mu((A \setminus B) \Delta B) \le \delta$. Thus
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\begin{align*}
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\norm{\nu_m(B) - \nu_n(B)}_E &= \norm{(\nu_m - \nu_n)(A \cup B) - (\nu_m - \nu_n)(A \setminus B)}_E \\
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&\le 2\eps
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\end{align*}
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and $\seq{\mu_n}$ is uniformly absolutely continuous with respect to $\mu$.
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(2): Let $\seq{A_n} \subset \cm$ and $A \in \cm$ with $A = \bigsqcup_{n \in \natp}A_n$, then for each $N \in \natp$,
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\[
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\norm{\nu(A) - \sum_{n = 1}^N \nu(A_n)}_E =
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\nu\paren{A \setminus \bigsqcup_{n = 1}^N A_n} =
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\limv{k}\nu_k\paren{A \setminus \bigsqcup_{n = 1}^N A_n}
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\]
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so $\nu$ is a vector measure. Absolute continuity is equivalent to uniform continuity as a mapping $\cm_n \to E$, and uniform absolute continuity is equivalent to uniform equicontinuity as mappings $\cm \to E$. By the \hyperref[Arzelà-Ascoli Theorem]{theorem:arzela-ascoli}, $\nu \in UC(\cm_0; E)$, so $\nu \ll \mu$.
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\end{proof}
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