On exponentiality of automorphisms of An of order p in characteristic p>0

Abstract

Let X be an integral affine scheme of characteristic p>0, and σ a non-identity automorphism of X. If σ is exponential, i.e., induced from a Ga-action on X, then σ is obviously of order p. It is easy to see that the converse is not true in general. In fact, there exists X which admits an automorphism of order p, but admits no non-trivial Ga-actions. However, the situation is not clear in the case where X is the affine space ARn, because ARn admits various Ga-actions as well as automorphisms of order p. In this paper, we study exponentiality of automorphisms of ARn of order p, where the difficulty stems from the non-uniqueness of Ga-actions inducing an exponential automorphism. Our main results are as follows. (1) We show that the triangular automorphisms of ARn of order p are exponential in some low-dimensional cases. (2) We construct a non-exponential automorphism of ARn of order p for each n 2. Here, R is any UFD which is not a field. (3) We investigate the Ga-actions inducing an elementary automorphism of ARn.