Singular string polytopes and functorial resolutions from Newton–Okounkov bodies

Abstract: The main result of this note is that the toric degenerations of flag varieties associated to string polytopes and certain Bott-Samelson resolutions of flag varieties fit into a commutative diagram which gives a resolution of singularities of singular toric varieties corresponding to string polytopes. Our main tool is a result of Anderson which shows that the toric degenerations arising from Newton-Okounkov bodies are functorial in an appropriate sense. We also use results of Fujita which show that Newton-Okoun… Show more

“…Remark 5.11 The polytope P i,m enjoys further nice properties. For instance, as proved in [19], under the condition (P ) the polytope P i,m coincides with the generalized string polytope introduced in [14]; the latter turns out to be unimodular to the polytope i,m we are considering in Section 4 (by [14,Theorem 8.2] along with Remark 4.2).…”

“…For some appropriate choice of (i, m), Bott-Samelson varieties Z i equipped with an ample line bundle L i,m can be degenerated into Bott manifolds using the theory of Newton-Okounkov bodies. These toric degenerations were derived in [19] from some previous constructions of Grossberg and Karshon (see [16] and [37] also). Next, we recall the main properties of these toric degenerations.…”

“…In Section 5, we consider the polarized Bott-Samelson varieties which can be degenerated into polarized Bott (toric) manifolds. These toric degenerations (and their underlying combinatorics) were thoroughly studied in [16,19,37]. The Gromov widths of polarized generalized Bott manifolds are computed in [21] 2 .…”

The Gromov Width of Bott-Samelson Varieties

“…Remark 5.11 The polytope P i,m enjoys further nice properties. For instance, as proved in [19], under the condition (P ) the polytope P i,m coincides with the generalized string polytope introduced in [14]; the latter turns out to be unimodular to the polytope i,m we are considering in Section 4 (by [14,Theorem 8.2] along with Remark 4.2).…”

“…For some appropriate choice of (i, m), Bott-Samelson varieties Z i equipped with an ample line bundle L i,m can be degenerated into Bott manifolds using the theory of Newton-Okounkov bodies. These toric degenerations were derived in [19] from some previous constructions of Grossberg and Karshon (see [16] and [37] also). Next, we recall the main properties of these toric degenerations.…”

“…In Section 5, we consider the polarized Bott-Samelson varieties which can be degenerated into polarized Bott (toric) manifolds. These toric degenerations (and their underlying combinatorics) were thoroughly studied in [16,19,37]. The Gromov widths of polarized generalized Bott manifolds are computed in [21] 2 .…”

The Gromov Width of Bott-Samelson Varieties