Asymptotic Chow stability of uniformly K-stable toric varieties

Abstract

For a polarized toric variety, we provide a sufficient criterion ensuring that a uniformly K-stable polarized toric variety (X,L) is asymptotically Chow polystable, under the assumption that the obstruction to asymptotic Chow semistability (the Futaki-Ono invariant) vanishes. Our approach is based on a detailed study of triangulations of neighborhoods of the vertices of the associated moment polytope Δ. As an application, we prove that every uniformly K-stable polarized smooth toric variety (X,L) with vanishing Futaki-Ono invariant is asymptotically Chow polystable.