English

Newton Polytopes in Algebraic Combinatorics

Combinatorics 2019-12-03 v2

Abstract

A polynomial has saturated Newton polytope (SNP) if every lattice point of the convex hull of its exponent vectors corresponds to a monomial. We compile instances of SNP in algebraic combinatorics (some with proofs, others conjecturally): skew Schur polynomials; symmetric polynomials associated to reduced words, Redfield--Polya theory, Witt vectors, and totally nonnegative matrices; resultants; discriminants (up to quartics); Macdonald polynomials; key polynomials; Demazure atoms; Schubert polynomials; and Grothendieck polynomials, among others. Our principal construction is the Schubitope. For any subset of [n] x [n], we describe it by linear inequalities. This generalized permutahedron conjecturally has positive Ehrhart polynomial. We conjecture it describes the Newton polytope of Schubert and key polynomials. We also define dominance order on permutations and study its poset-theoretic properties.

Keywords

Cite

@article{arxiv.1703.02583,
  title  = {Newton Polytopes in Algebraic Combinatorics},
  author = {Cara Monical and Neriman Tokcan and Alexander Yong},
  journal= {arXiv preprint arXiv:1703.02583},
  year   = {2019}
}

Comments

30 pages

R2 v1 2026-06-22T18:39:02.908Z