Factorial rational varieties which admit or fail to admit an elliptic Gm-action

Abstract

Over a field k, we study rational UFDs of finite transcendence degree n over k. We classify such UFDs B when n=2, k is algebraically closed, and B admits a positive Z-grading, showing in particular that B is affine over k. We also consider the Russell cubic threefold over C, and the Asanuma threefolds over a field of positive characterstic, showing that these threefolds admit no elliptic Gm-action. Finally, we show that, if X is an affine k-variety and X×AmkkAn+mk, then XkAnk if and only if X admits an elliptic Gm-action.