On Maximal Symmetries of Toric Varieties over Fields of Characteristic Zero

Abstract

In this paper, we study complete simplicial toric varieties admitting faithful actions of large symmetric groups. First, we correct a recent classification result by Esser, Ji, and Moraga concerning 4-dimensional toric varieties with S6-actions over the complex numbers C, providing the complete list of such varieties. Second, we extend the study of maximal symmetric group actions to non-closed fields k of characteristic zero satisfying a certain arithmetic condition (such as Q or R). Over such fields, we reveal a striking rigidity in dimensions n ≠ 2, where the maximal symmetric action uniquely restricts the variety to the projective space Pnk. In sharp contrast, for dimension n=2, we discover and classify an infinite family of split and non-split toric surfaces admitting faithful S4-actions by utilizing the equivariant Minimal Model Program and Galois descent.