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Fix two self references

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aisejohan committed Nov 8, 2019
1 parent 477edb7 commit 86638d2c6cb73925e5cceeb28a58342068471929
Showing with 2 additions and 2 deletions.
  1. +1 −1 cohomology.tex
  2. +1 −1 sites-cohomology.tex
@@ -11223,7 +11223,7 @@ \section{Invertible objects in the derived category}
\end{enumerate}
It follows that $M^\bullet$ and $N^\bullet$ define
mutually inverse objects of $D(R)$. By
More on Algebra, Lemma \ref{lemma-invertible-derived}
More on Algebra, Lemma \ref{more-algebra-lemma-invertible-derived}
we find a product decomposition $R = \prod_{a \leq n \leq b} R_n$
and invertible $R_n$-modules $H^n$ such
that $M^\bullet \cong \bigoplus_{a \leq n \leq b} H^n[-n]$.
@@ -12113,7 +12113,7 @@ \section{Invertible objects in the derived category}
\end{enumerate}
It follows that $M^\bullet$ and $N^\bullet$ define
mutually inverse objects of $D(R)$. By
More on Algebra, Lemma \ref{lemma-invertible-derived}
More on Algebra, Lemma \ref{more-algebra-lemma-invertible-derived}
we find a product decomposition $R = \prod_{a \leq n \leq b} R_n$
and invertible $R_n$-modules $H^n$ such
that $M^\bullet \cong \bigoplus_{a \leq n \leq b} H^n[-n]$.

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