Free affine Zp-actions on Tori

Abstract

We prove that any Zp-action A that acts by automorphisms of Zq with a non-zero fixed-point set induces a unipotent factor of the Zp-action A which determines whether the action A is liberated affine, i.e. A is the linear part of a free affine Zp-action on the torus Tq. In general, it is not true that all unipotent Zp-actions U on Zq are liberated affine: counter-examples appear for q≥ 4. But if the dimension of the fixed-point set of U regarded as a subspace of Zq is less than q/2, then U is liberated affine. If q≤3, then a Zp-action on Zq with non-zero fixed-point set is liberated affine. Finally, for unipotent Zp-actions on Z3, we obtain a classification of all those that are the linear part of a minimal free affine Zp-action on T3.