Jordan property for Cremona groups
Abstract
Assuming Borisov--Alexeev--Borisov conjecture, we prove that there is a constant J=J(n) such that for any rationally connected variety X of dimension n and any finite subgroup G⊂ Bir(X) there exists a normal abelian subgroup A⊂ G of index at most J. In particular, we obtain that the Cremona group Cr3=Bir(P3) enjoys the Jordan property.
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