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Copy file name to clipboardExpand all lines: Lectures/Lecture 9.tex
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@@ -239,7 +239,7 @@ \section{Exact sequences}
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\begin{lem}
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Let \(\mathcal F^\bullet\) be a cochain complex in \(\catAbelianSheaf(X)\).
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Then \(\mathcal F^\bullet\) is exact at \(\mathcal F^i\) if and only if \(\mathcal F^\bullet_x\) is exact at \(\mathcal F^i_x\)is exact for all \(x\in X\).
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Then \(\mathcal F^\bullet\) is exact at \(\mathcal F^i\) if and only if \(\mathcal F^\bullet_x\) is exact at \(\mathcal F^i_x\) for all \(x\in X\).
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