Algebraic density property of homogeneous spaces

Abstract

Let X be an affine algebraic variety with a transitive action of the algebraic automorphism group. Suppose that X is equipped with several non-degenerate fixed point free SL2-actions satisfying some mild additional assumption. Then we show that the Lie algebra generated by completely integrable algebraic vector fields on X coincides with the set of all algebraic vector fields. In particular, we show that apart from a few exceptions this fact is true for any homogeneous space of form G/R where G is a linear algebraic group and R is its proper reductive subgroup.