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@@ -135,7 +135,7 @@
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\item $I_g(f) + I_g(f') \le I_g(f + f') + \eps$.
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\item $I_g(f) + I_g(f') \le I_g(f + f') + \eps$.
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\end{enumerate}
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\end{enumerate}
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In which case, $I(f) + I(f') \le I(f + f') + \eps$. Since this holds for all $\eps > 0$,
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In which case, $I(f) + I(f') \le I(f + f') + 3\eps$. Since this holds for all $\eps > 0$,
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\begin{enumerate}[start=4, label=(\roman*)]
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\begin{enumerate}[start=4, label=(\roman*)]
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\item For each $f, f' \in C_c^+(G)$, $I(f + g) \ge I(f) + I(g)$.
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\item For each $f, f' \in C_c^+(G)$, $I(f + g) \ge I(f) + I(g)$.
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\end{enumerate}
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\end{enumerate}
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