Definition 111.40.4 (02AG)—The Stacks project

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Table of contents
Part 9: Miscellany
Chapter 111: Exercises
Section 111.40: Invertible sheaves
Definition 111.40.4 (cite)

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Definition 111.40.4. Let $R$ be a ring. An invertible module $M$ is an $R$ -module $M$ such that $\widetilde M$ is an invertible sheaf on the spectrum of $R$ . We say $M$ is trivial if $M \cong R$ as an $R$ -module.

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