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@@ -177,7 +177,7 @@ |
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$\forall i, j \in \N$ mit $i \neq j$. Damit folgt wegen |
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$\mathcal{D}$ Dynkinsystem |
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\[ |
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\bigcup_{i \in \N} A_i = \mathop{\dot{\bigcup_{i \in \N}}} B_i \in \mathscr{D} |
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\bigcup_{i \in \N} A_i = \bigcupdot_{i \in \N} B_i \in \mathscr{D} |
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.\] |
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\end{enumerate} |
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\end{proof} |
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@@ -191,16 +191,17 @@ |
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\item Sei $A \in \mathscr{H}(D)$. Dann ist $A \cap D \in \mathscr{D}_0$. Da |
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$\mathscr{D}_0$ Dynkinsystem folgt: |
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\begin{align*} |
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A^{c} \cap D = (X \setminus A) \cap D = (X \cap D) \setminus (A \cap D) |
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= \left( (X \cap D)^{c} \mathop{\dot{\cup}} (A \cap D) \right)^{c} |
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A^{c} \cap D |
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= D \setminus (A \cap D) |
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= \left( D^{c} \cupdot (A \cap D) \right)^{c} |
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\in \mathscr{D}_0 |
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.\end{align*} |
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\item Sei $A_i \in \mathscr{H}(D)$ $\forall i \in \N$ mit $A_i \cap A_j = \emptyset$ |
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$\forall i, j \in \N, i \neq j$. Dann folgt direkt, da die $A_i$ paarweise |
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disjunkt sind und $\mathscr{D}_0$ Dynkinsystem: |
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\[ |
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\left( \bigcup_{i \in \N} A_i \right) \cap D |
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= \mathop{\dot{\bigcup_{i \in \N}}} (\underbrace{A_i \cap D}_{ \in \mathscr{D}_0}) |
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\left( \bigcupdot_{i \in \N} A_i \right) \cap D |
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= \bigcupdot_{i \in \N} (\underbrace{A_i \cap D}_{ \in \mathscr{D}_0}) |
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\in \mathscr{D}_0 |
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.\] |
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\end{enumerate} |
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