Families of Group Actions, Generic Isotriviality, and Linearization

Abstract

We prove a "Generic Equivalence Theorem which says that two affine morphisms p: S Y and q: T Y of varieties with isomorphic (closed) fibers become isomorphic under a dominant etale base change φ: U Y. A special case is the following result. Call a morphism φ: X Y a "fibration with fiber F" if φ is flat and all fibers are (reduced and) isomorphic to F. Then an affine fibration with fiber F admits an etale dominant morphism μ: U Y such that the pull-back is a trivial fiber bundle: U×Y X U× F. As an application we give short proofs of the following two (known) results: (a) Every affine 1-fibration over a normal variety is locally trivial in the Zariski-topology; (b) Every affine 2-fibration over a smooth curve is locally trivial in the Zariski-topology. We also study families of reductive group actions on 2 parametrized by curves and show that every faithful action of a non-finite reductive group on 3 is linearizable, i.e. G-isomorphic to a representation of G.