Completion of two-parameter period maps by nilpotent orbits
classification
🧮 math.AG
keywords
periodcompletionmapsmorphismtwo-parameteradmitsalgebraicapplies
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We show that every two-parameter period map admits a Kato--Nakayama--Usui completion to a morphism of log manifolds, and the map onto the image is a morphism of compact algebraic spaces. This result also applies to the case of mixed period maps and we use it to give a construction of generalized N\`eron models.
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