English

The Integer Decomposition Property and Weighted Projective Space Simplices

Combinatorics 2022-11-23 v2 Commutative Algebra Algebraic Geometry

Abstract

Reflexive lattice polytopes play a key role in combinatorics, algebraic geometry, physics, and other areas. One important class of lattice polytopes are lattice simplices defining weighted projective spaces. We investigate the question of when a reflexive weighted projective space simplex has the integer decomposition property. We provide a complete classification of reflexive weighted projective space simplices having the integer decomposition property for the case when there are at most three distinct non-unit weights, and conjecture a general classification for an arbitrary number of distinct non-unit weights. Further, for any weighted projective space simplex and m1m\geq 1, we define the mm-th reflexive stabilization, a reflexive weighted projective space simplex. We prove that when mm is 22 or greater, reflexive stabilizations do not have the integer decomposition property. We also prove that the Ehrhart hh^\ast-polynomial of any sufficiently large reflexive stabilization is not unimodal and has only 11 and 22 as coefficients. We use this construction to generate interesting examples of reflexive weighted projective space simplices that are near the boundary of both hh^*-unimodality and the integer decomposition property.

Keywords

Cite

@article{arxiv.2103.17156,
  title  = {The Integer Decomposition Property and Weighted Projective Space Simplices},
  author = {Benjamin Braun and Robert Davis and Derek Hanely and Morgan Lane and Liam Solus},
  journal= {arXiv preprint arXiv:2103.17156},
  year   = {2022}
}
R2 v1 2026-06-24T00:44:24.666Z