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ws2020/ana/uebungen/ana2.pdf
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ws2020/ana/uebungen/ana2.tex
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| @@ -243,10 +243,29 @@ | |||||
| \[ | \[ | ||||
| 1 = \nu(E) \le \underbrace{\nu(E \cap A)}_{\le 1} + \underbrace{\nu(E \cap A^{c})}_{=0} | 1 = \nu(E) \le \underbrace{\nu(E \cap A)}_{\le 1} + \underbrace{\nu(E \cap A^{c})}_{=0} | ||||
| \implies \nu(E \cap A) = 1 \implies A \in \mathscr{M} | \implies \nu(E \cap A) = 1 \implies A \in \mathscr{M} | ||||
| .\] Also insgesamt $F \subseteq M$. | |||||
| .\] Also insgesamt $\mathscr{F} \subseteq \mathscr{M}$. | |||||
| \end{itemize} | \end{itemize} | ||||
| \end{proof} | \end{proof} | ||||
| \end{enumerate} | \end{enumerate} | ||||
| \end{aufgabe} | \end{aufgabe} | ||||
| \begin{aufgabe} | |||||
| Beh.: $\mu$ ist ein Maß. | |||||
| \begin{proof} | |||||
| \begin{enumerate}[(i)] | |||||
| \item $\mu(\emptyset) = 0$, denn $\#(\emptyset \cap \{1, \ldots, n\}) = 0$ $\forall n \in \N$. | |||||
| \item Sei $A_i \in \mathscr{P}(\N)$ für $i \in \N$ und $A_i \cap A_j = \emptyset$ für $i\neq j$. | |||||
| Dann gilt | |||||
| \begin{salign*} | |||||
| \mu\left( \bigcupdot_{i \in \N} A_i \right) | |||||
| &= \limsup_{n \to \infty} \frac{1}{n} \# \left( \bigcupdot_{i \in \N} A_i \cap \{1, \ldots, n\} \right) \\ | |||||
| &= \limsup_{n \to \infty} \frac{1}{n} \# \left( \bigcupdot_{i \in \N} (A_i \cap \{1, \ldots, n\} ) \right) \\ | |||||
| &\stackrel{\text{disj. Ver.}}{=} \limsup_{n \to \infty} \frac{1}{n} \sum_{i \in \N} \#(A_i \cap \{1, \ldots, n\}) \\ | |||||
| &= \sum_{i \in \N} \limsup_{n \to \infty} \frac{1}{n} \#(A_i \cap \{1, \ldots, n\}) \\ | |||||
| &= \sum_{i \in \N} \mu(A_i) | |||||
| .\end{salign*} | |||||
| \end{enumerate} | |||||
| \end{proof} | |||||
| \end{aufgabe} | |||||
| \end{document} | \end{document} | ||||