Automorphism Groups of Danielewski Surfaces

Abstract

In this note we study the automorphism group of a smooth Danielewski surface Dp= \(x,y,z) ∈ A3 xy = p(z) \ ⊂ A3, where p ∈ C[z] is a polynomial without multiple roots and deg (p) 3. It is known that two such generic surfaces Dp and Dq have isomorphic automorphism groups. Moreover, Aut(Dp) is generated by algebraic subgroups and there is a natural isomorphism φ Aut(Dp) Aut(Dq) which restricts to an isomorphism of algebraic groups G φ(G) for any algebraic subgroup G ⊂ Aut(Dp). In contrast, we prove that Aut(Dp) and Aut(Dq) are isomorphic as ind-groups if and only if Dp Dq as a variety. Moreover, we show that any automorphism of the ind-group Aut(Dp) is inner.