中文

Explicit Construction of Polytopes whose Ehrhart Polynomials Realize any Given Sign Pattern

组合数学 2026-05-26 v2

摘要

In Ehrhart theory, the well-known sign pattern problem asks: given a positive integer d3d\geq 3 and integers 1i1<<ikd21 \leq i_1 < \cdots < i_k \leq d-2, does there exist a dd-dimensional integral polytope P\mathcal{P} such that in its Ehrhart polynomial i(P,t)i(\mathcal{P}, t) the coefficients of ti1,,tikt^{i_1}, \ldots, t^{i_k} are negative, while all remaining coefficients are positive? This problem was proposed by Hibi, Higashitani, Tsuchiya, and Yoshida. In this paper, we first construct a class of simplices Sd(m)\mathcal{S}_d(m) whose Ehrhart polynomial has leading coefficient mm and all other coefficients fixed positive constants. Then, using the Cartesian product of Sd(m)\mathcal{S}_d(m) and the Reeve tetrahedron, we obtain the first complete solution to the sign pattern problem. Finally, while attacking the sign pattern problem, we discovered a fast algorithm for computing the hh^*-polynomial of a class of simplices Δ(0,q)\Delta(0,q). This algorithm is crucial for constructing the simplices Sd(m)\mathcal{S}_d(m).

关键词

引用

@article{arxiv.2605.23544,
  title  = {Explicit Construction of Polytopes whose Ehrhart Polynomials Realize any Given Sign Pattern},
  author = {Feihu Liu and Sihao Tao and Guoce Xin},
  journal= {arXiv preprint arXiv:2605.23544},
  year   = {2026}
}

备注

38 pages