Newton-Okounkov polytopes of Bott-Samelson varieties as Minkowski sums

Abstract

We compute the Newton--Okounkov bodies of line bundles on a Bott--Samelson resolution of the complete flag variety of GLn for a geometric valuation coming from a flag of translated Schubert subvarieties. The Bott--Samelson resolution corresponds to the decomposition (s1)(s2s1)(s3s2s1)(…)(sn-1… s1) of the longest element in the Weyl group, and the Schubert subvarieties correspond to the terminal subwords in this decomposition. We prove that the resulting Newton--Okounkov polytopes for semiample line bundles satisfy the additivity property with respect to the Minkowski sum. In particular, they are Minkowski sums of Newton--Okounkov polytopes of line bundles on the complete flag varieties for GL2,…, GLn.