diff --git a/src/fa/lp/ui.tex b/src/fa/lp/ui.tex index fc15291..2c2a971 100644 --- a/src/fa/lp/ui.tex +++ b/src/fa/lp/ui.tex @@ -144,8 +144,8 @@ \label{corollary:dct-filter} Let $(X, \cm, \mu)$ be a measure space, $p \in [1, \infty)$, $E$ be a normed vector space over $K \in \RC$, $\fF \subset 2^{L^p(X; E)}$ be a filter, and $g, h \in L^p(X; \real)$ such that: \begin{enumerate}[label=(\alph*)] - \item $\fF \to g$ locally in measure. - \item There exists $F \in \fF$ such that $|f| \le h$ for all $f \in F$. + \item[(M)] $\fF \to g$ locally in measure. + \item[(D)] There exists $F \in \fF$ such that $|f| \le h$ for all $f \in F$. \end{enumerate} then $\fF \to f$ in $L^p(X; E)$. In particular, if $p = 1$, then @@ -154,7 +154,7 @@ \] \end{corollary} \begin{proof} - By \autoref{theorem:vitali-convergence}. + Since (D) implies (UI) and (T) of the \hyperref[Vitali Convergence Theorem]{theorem:vitali-convergence}, the result follows from the Vitali Convergence Theorem. \end{proof} \begin{lemma}[Scheffé]