Proposition 3.13.8.label Let $X$ be an LCH space, $K\suf X$ compact and $\curl{U_i}_{i\in I}$ an open cover of $K$ then there exists a $C_{c}$ partition of unity on $K$ subordinate to $\curl{U_i}_{i\in I}$.
Proof. $\square$
Proposition 3.13.8.label Let $X$ be an LCH space, $K\suf X$ compact and $\curl{U_i}_{i\in I}$ an open cover of $K$ then there exists a $C_{c}$ partition of unity on $K$ subordinate to $\curl{U_i}_{i\in I}$.
Proof. $\square$
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