Subgroups of polynomial automorphisms with diagonalizable fibers

Abstract

Let R be an integral domain over a field k, and G a subgroup of the automorphism group of the polynomial ring R[x1,..., xn] over R. In this paper, we discuss when G is diagonalizable under the assumption that G is diagonalizable over the field of fractions of R. We are particularly interested in the case where G is a finite abelian group. Kraft-Russell (2014) implies that every finite abelian subgroup of AutR(R[x1,x2]) is diagonalizable if R is an affine PID over k= C. One of the main results of this paper says that the same holds for a PID R over any field k containing enough roots of unity.