The augmented base locus in positive characteristic
classification
🧮 math.AG
keywords
characteristicaugmentedbaselocuspositivebundleclosedequal
read the original abstract
Let L be a nef line bundle on a projective scheme X in positive characteristic. We prove that the augmented base locus of L is equal to the union of the irreducible closed subsets V of X such that the restriction of L to V is not big. For a smooth variety in characteristic zero, this was proved by Nakamaye using vanishing theorems.
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