Linearity and Nonlinearity of Groups of Polynomial Automorphisms of the Plane

Abstract

Given a field K, we investigate which subgroups of the group AutA2K of polynomial automorphisms of the plane are linear or not. The results are contrasted. The group AutA2K itself is nonlinear, except if K is finite, but it contains some large "finite-codimensional" subgroups which are linear. This phenomenon is specific to dimension two: it is easy to prove that any "finite-codimensional" subgroup of AutA3K is nonlinear, even for a finite field K. When chK = 0, we also look at a similar questions for f.g. subgroups, and the results are again disparate. The group AutA2K has a one-related f.g. subgroup which is not linear. However, there is a large subgroup, of "co-dimension-three", which is locally linear but not linear. This paper is respectfully dedicated to the memory of Jacques Tits.