English

Minimal and minimum unit circular-arc models

Discrete Mathematics 2017-10-11 v3

Abstract

A proper circular-arc (PCA) model is a pair M=(C,A){\cal M} = (C, \cal A) where CC is a circle and A\cal A is a family of inclusion-free arcs on CC in which no two arcs of A\cal A cover CC. A PCA model U=(C,A)\cal U = (C,\cal A) is a (c,)(c, \ell)-CA model when CC has circumference cc, all the arcs in A\cal A have length \ell, and all the extremes of the arcs in A\cal A are at a distance at least 11. If ccc \leq c' and \ell \leq \ell' for every (c,)(c', \ell')-CA model equivalent (resp. isomorphic) to U\cal U, then U\cal U is minimal (resp. minimum). In this article we prove that every PCA model is isomorphic to a minimum model. Our main tool is a new characterization of those PCA models that are equivalent to (c,)(c,\ell)-CA models, that allows us to conclude that cc and \ell are integer when U\cal U is minimal. As a consequence, we obtain an O(n3)O(n^3) time and O(n2)O(n^2) space algorithm to solve the minimal representation problem, while we prove that the minimum representation problem is NP-complete.

Cite

@article{arxiv.1609.01266,
  title  = {Minimal and minimum unit circular-arc models},
  author = {Francisco J. Soulignac and Pablo Terlisky},
  journal= {arXiv preprint arXiv:1609.01266},
  year   = {2017}
}

Comments

22 pages, 18 figures

R2 v1 2026-06-22T15:40:26.368Z