Small G-varieties

Abstract

An affine varieties with an action of a semisimple group G is called "small" if every non-trivial G-orbit in X is isomorphic to the orbit of a highest weight vector. Such a variety X carries a canonical action of the multiplicative group K* commuting with the G-action. We show that X is determined by the K*-variety XU of fixed points under a maximal unipotent subgroups U of G. Moreover, if X is smooth, then X is a G-vector bundle over the quotient X// G. If G is of type An (n>1), Cn, E6, E7 or E8, we show that all affine G-varieties up to a certain dimension are small. As a consequence we have the following result. If n>4, every smooth affine SLn-variety of dimension <2n is an SLn-vector bundle over the smooth quotient X//SLn, with fiber isomorphic to the natural representation or its dual.