Bundles on non-proper schemes: representability
classification
🧮 math.AG
keywords
algebraicartinawaybundlesclosedcodimensionconditiondefined
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Let X be a proper scheme over a field k which satisfies Serre's condition S2 and G a reductive group over k. We prove that the functor of principal G-bundles defined away from a non-fixed closed subset in X of codimension at least 3, is an algebraic stack in the sense of Artin.
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