Automorphism Groups of Affine Varieties and a Characterization of Affine n-Space

Abstract

We show that the automorphism group of affine n-space An determines An up to isomorphism: If X is a connected affine variety such that Aut(X) is isomorphic to Aut(An) as ind-groups, then X is isomorphic to An as a variety. We also show that every finite group and every torus appears as Aut(X) for a suitable affine variety X, but that Aut(X) cannot be isomorphic to a semisimple group. In fact, if Aut(X) is finite dimensional and X not isomorphic to the affine line A1, then the connected component Aut(X)0 is a torus. Concerning the structure of Aut(An) we prove that any homomorphism Aut(An) G of ind-groups either factors through the Jacobian determinant jac Aut(An) k*, or it is a closed immersion. For SAut(An):=(jac) we show that every nontrivial homomorphism SAut(An) G is a closed immersion. Finally, we prove that every non-trivial homomorphism SAut(An) SAut(An) is an automorphism, and is given by conjugation with an element from Aut(An).