Fix two typos in divisors

divisors.tex

@@ -924,7 +924,7 @@ \section{Morphisms and weakly associated points}
 then $s$ is not associated to $f_*\mathcal{F}$.
 \item If $s \not \in f(X)$, $(f_*\mathcal{F})_s$ is a finite
 $\mathcal{O}_{S, s}$-module, and $\mathcal{O}_{S, s}$
-is Noetherian, then $\text{depth}(f_*\mathcal{O}_{S, s}) \geq 2$.
+is Noetherian, then $\text{depth}((f_*\mathcal{F})_s) \geq 2$.
 \item If $\mathcal{F}$ is flat over $S$ and $a \in \mathfrak m_s$
 is a nonzerodivisor, then $a$ is a nonzerodivisor on $(f_*\mathcal{F})_s$.
 \item If $\mathcal{F}$ is flat over $S$ and $a, b \in \mathfrak m_s$
@@ -942,7 +942,7 @@ \section{Morphisms and weakly associated points}
 Part (2) follows from (1) and Lemma \ref{lemma-ass-weakly-ass}.
 
 \medskip\noindent
-Proof of part (3). To show the depth is $\geq w$ it suffices to show that
+Proof of part (3). To show the depth is $\geq 2$ it suffices to show that
 $\Hom_{\mathcal{O}_{S, s}}(\kappa(s), (f_*\mathcal{F})_s) = 0$ and
 $\Ext^1_{\mathcal{O}_{S, s}}(\kappa(s), (f_*\mathcal{F})_s) = 0$, see
 Algebra, Lemma \ref{algebra-lemma-depth-ext}.