Almost Proper GIT-Stacks and Discriminant Avoidance

Jason Starr; Johan de Jong

doi:10.4171/DM/319

Almost Proper GIT-Stacks and Discriminant Avoidance

Jason Starr
, Johan de Jong

Mathematics

Stony Brook University

Columbia University

Research output: Contribution to journal › Article › peer-review

12 Scopus citations

Abstract

We prove that the classifying stack of an reductive group scheme over a field is very close to being proper. Using this we prove a result about isotrivial families of varieties. Fix a polarized variety with reductive automorphism group. To prove that every isotrivial family with this fibre has a rational section it suffices to prove this when the base is projective, i.e., the discriminant of the family is empty.

Original language	English
Pages (from-to)	957-972
Number of pages	16
Journal	Documenta Mathematica
Volume	15
DOIs	https://doi.org/10.4171/DM/319
State	Published - 2010

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AB - We prove that the classifying stack of an reductive group scheme over a field is very close to being proper. Using this we prove a result about isotrivial families of varieties. Fix a polarized variety with reductive automorphism group. To prove that every isotrivial family with this fibre has a rational section it suffices to prove this when the base is projective, i.e., the discriminant of the family is empty.

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Almost Proper GIT-Stacks and Discriminant Avoidance

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