Reflexivity of Newton-Okounkov bodies of partial flag varieties

Abstract

Assume that the valuation semigroup (λ) of an arbitrary partial flag variety corresponding to the line bundle Lλ constructed via a full-rank valuation is finitely generated and saturated. We use Ehrhart theory to prove that the associated Newton-Okounkov body, which happens to be a rational, convex polytope, contains exactly one lattice point in its interior if and only if Lλ is the anticanonical line bundle. Furthermore we use this unique lattice point to construct the dual polytope of the Newton-Okounkov body and prove that this dual is a lattice polytope using a result by Hibi. This leads to an unexpected, necessary and sufficient condition for the Newton-Okounkov body to be reflexive.