Automorphism groups of rigid affine surfaces: the identity component

Abstract

It is known that the identity component of the automorphism group of a projective algebraic variety is an algebraic group. This is not true in general for quasi-projective varieties. In this note we address the question: given an affine algebraic surface Y, as to when the identity component Aut0 (Y) of the automorphism group Aut (Y) is an algebraic group? We show that this happens if and only if Y admits no effective action of the additive group of the field. In the latter case, Aut0 (Y) is an algebraic torus of rank 2.