Valuative compactifications of analytic varieties
Abstract
Let X be an algebraic variety over C. We define a canonical compactification X\! of the complex analytic space X(C) by adding a Berkovich space over a trivially valued field at the boundary. The construction is functorial with respect to proper morphisms and preserves many properties, such as normality, regularity, etc. We prove a partial GAGA theorem in this setting : there is an equivalence between the categories of coherent sheaves on X and X\!, and it induces bijections on global sections. The results still hold if C is replaced by a complete non-trivially valued field k, and complex analytic spaces by Berkovich analytic spaces over k.
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