中文

Planarity and dimension II

组合数学 2026-07-10 v1

摘要

The dimension of a poset PP is the minimum positive integer dd such that PP is an induced subposet of Rd\mathbb{R}^d equipped with the product order. We give a constant-factor polynomial-time approximation algorithm for computing dimension in the class of posets with a planar (Hasse) diagram. While computing the dimension of a poset is NP-hard in general, the computational complexity of the problem for planar posets remains open. The algorithmic result is driven by a structural understanding of the canonical obstruction to small dimension: standard examples. A longstanding problem, originating in the early 1980s, asked whether every poset with a planar diagram has dimension bounded by a function of the maximum order of a standard example that it contains. In the first paper of the series, we have resolved the problem in a more general setting of posets with planar cover graphs by establishing a polynomial bound. We prove a stronger bound in the original setting, namely, for every poset PP with a planar diagram dim(P)96se(P)+672\mathrm{dim}(P) \leq 96\mathrm{se}(P)+672, where dim(P)\mathrm{dim}(P) denotes the dimension of PP and se(P)\mathrm{se}(P) denotes the maximum order of a standard example contained in PP.

引用

@article{arxiv.2607.09294,
  title  = {Planarity and dimension II},
  author = {Heather S. Blake and Jędrzej Hodor and Piotr Micek and Michał T. Seweryn and William T. Trotter},
  journal= {arXiv preprint arXiv:2607.09294},
  year   = {2026}
}

备注

57 pages. arXiv admin note: text overlap with arXiv:2510.18603