Canonical factorization of the quotient morphism for an affine Ga-variety

Abstract

Working over a ground field of characteristic zero, this paper studies the quotient morphism π :X Y for an affine Ga-variety X with affine quotient Y. It is shown that the degree modules associated to the Ga-action give a uniquely determined sequence of dominant Ga-equivariant morphisms, X=Xr Xr-1·s X1 X0=Y, where Xi is an affine Ga-variety and Xi+1 Xi is birational for each i 1. This is the canonical factorization of π. We give an algorithm for finding the degree modules associated to the given Ga-action, and this yields the canonical factorization of the quotient morphism. The algorithm is applied to compute the canonical factorization for several examples, including the homogeneous (2,5)-action on A3. By a fundamental result of Kaliman and Zaidenberg, any birational morphism of affine varieties is an affine modification, and each mapping in these examples is presented as a Ga-equivariant affine modification.