The Gromov-Winkelmann theorem for flexible varieties

Abstract

An affine variety X of dimension 2 is called flexible if its special automorphism group SAut(X) acts transitively on the smooth locus Xreg AKZ. Recall that the special automorphism group SAut(X) is the subgroup of the automorphism group Aut(X) generated by all one-parameter unipotent subgroups AKZ. Given a normal, flexible, affine variety X and a closed subvariety Y in X of codimension at least 2, we show that the pointwise stabilizer subgroup of Y in the group SAut(X) acts infinitely transitively on the complement X Y, that is, m-transitively for any m 1. More generally we show such a result for any quasi-affine variety X and codimension 2 subset Y of X. In the particular case of X=n, n 2, this yields a Theorem of Gromov and Winkelmann Gr1, Wi.