Lattice-free Schubitopes
Abstract
In this paper, we provide a simple criterion for the Schubitope SD associated to a diagram D to be lattice-free. We further show that SD is lattice-free if and only if its Ehrhart polynomial is equal to the product of Ehrhart polynomials of the Schubert matroid polytopes corresponding to each column of D. As applications, we obtain that the Newton polytopes of the Schubert polynomial Sw(x) and the Grothendieck polynomial Gw(x) are lattice-free if and only if w avoids the patterns 1423, 1432, 13254, and confirm several conjectures by M\'esz\'aros, Setiabrata, and St.Dizier on the support of Grothendieck polynomials for this class of permutations.
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