Added missing justification.
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@@ -77,11 +77,18 @@
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\norm{\nu(A) - \sum_{n = 1}^N \nu(A_n)}_E &=
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\norm{\nu\paren{A \setminus \bigsqcup_{n = 1}^N A_n}}_E \\
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&=
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\norm{\limv{k}\nu_k\paren{A \setminus \bigsqcup_{n = 1}^N A_n}}_E
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\limv{k}\norm{\nu_k\paren{A \setminus \bigsqcup_{n = 1}^N A_n}}_E
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\end{align*}
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Since $\seq{\nu_k}$ is uniformly absolutely continuous,
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\[
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\lim_{N \to \infty}\sup_{k \in \natp}\norm{\nu_k\paren{A \setminus \bigsqcup_{n = 1}^N A_n}}_E = 0
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\]
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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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so $\nu$ is a vector measure.
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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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