From b4cb2da7070d863e3cbb9cb66406cfcdbc70b9a9 Mon Sep 17 00:00:00 2001
From: Adrian Kummerlaender
Date: Sat, 18 Mar 2017 21:53:39 +0100
Subject: Add more descriptive property section titles

---
 content/analysis_3.tex | 4 ++--
 1 file changed, 2 insertions(+), 2 deletions(-)

(limited to 'content')

diff --git a/content/analysis_3.tex b/content/analysis_3.tex
index 79263f0..798b7c9 100644
--- a/content/analysis_3.tex
+++ b/content/analysis_3.tex
@@ -156,7 +156,7 @@ $\lambda(I) = \lambda_m(I) := (b_1 - a_1) \cdot \hdots \cdot (b_m - a_m)$
 
 $$\F_m = \left\{ A = \bigcup_{j=1}^n I_j | I_j \in \J_m, n \in \N \right\}$$
 
-\subsubsection*{Eigenschaften}
+\subsubsection*{Eigenschaften des Ring der Figuren}
 
 Seien $I_1, I_2 \in \J_m$:
 
@@ -180,7 +180,7 @@ Seien $X, Y$ metrische Räume.
 
 Die Funktion $f : X \to Y$ heißt Borel-messbar, wenn sie $\B(X)$-$\B(Y)$-messbar ist.
 
-\subsection*{Eigenschaften}
+\subsection*{Eigenschaften Borel-messbarer Fkt.}
 
 Seien $\A, \B, \C$ $\sigma$-Algebren auf $X, Y, Z \neq \emptyset$.
 
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