Lemma 6.1.3.label Let $G$ be a locally compact group, $f,g\in C_{c}^{+}(G)$ and $\e>0$ then $\exists V\in\cali{N}_{G}(1)$ such that $I_{\phi}(f)+I_{\phi}(g)\leq I_{\phi}(f+g)+\e$ whenever $\supp{\phi}\suf V$.
Proof. $\square$
Lemma 6.1.3.label Let $G$ be a locally compact group, $f,g\in C_{c}^{+}(G)$ and $\e>0$ then $\exists V\in\cali{N}_{G}(1)$ such that $I_{\phi}(f)+I_{\phi}(g)\leq I_{\phi}(f+g)+\e$ whenever $\supp{\phi}\suf V$.
Proof. $\square$
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