The automorphism group of a rigid affine variety

Abstract

An irreducible algebraic variety X is rigid if it admits no nontrivial action of the additive group of the ground field. We prove that the automorphism group Aut(X) of a rigid affine variety contains a unique maximal torus T. If the grading on the algebra of regular functions K[X] defined by the action of T is pointed, the group Aut(X) is a finite extension of T. As an application, we describe the automorphism group of a rigid trinomial affine hypersurface and find all isomorphisms between such hypersurfaces.