English

Antichain Simplices

Combinatorics 2019-01-11 v2 Commutative Algebra Number Theory

Abstract

To each lattice simplex Δ\Delta we associate a poset encoding the additive structure of lattice points in the fundamental parallelepiped for Δ\Delta. When this poset is an antichain, we say Δ\Delta is antichain. To each partition λ\lambda of nn, we associate a lattice simplex Δλ\Delta_\lambda having one unimodular facet, and we investigate their associated posets. We give a number-theoretic characterization of the relations in these posets, as well as a simplified characterization in the case where each part of λ\lambda is relatively prime to n1n-1. We use these characterizations to experimentally study Δλ\Delta_\lambda for all partitions of nn with n73n\leq 73. We also investigate the structure of these posets when λ\lambda has only one or two distinct parts. Finally, we explain how this work relates to Poincar\'e series for the semigroup algebra associated to Δ\Delta, and we prove that this series is rational when Δ\Delta is antichain.

Keywords

Cite

@article{arxiv.1901.01417,
  title  = {Antichain Simplices},
  author = {Benjamin Braun and Brian Davis},
  journal= {arXiv preprint arXiv:1901.01417},
  year   = {2019}
}
R2 v1 2026-06-23T07:03:49.926Z