English

Tolerance Orders of Open and Closed Intervals

Combinatorics 2017-07-26 v1

Abstract

In this paper we combine ideas from tolerance orders with recent work on OC interval orders. We consider representations of posets by unit intervals IvI_v in which the interval endpoints (L(v)L(v) and R(v)R(v)) may be open or closed as well as the center point (c(v)c(v)). This yields four types of intervals: AA (endpoints and center points closed), BB (endpoints and center points open), CC (endpoints closed, center points open), and DD (endpoints open, center points closed). For any non-empty subset SS of {A,B,C,D}\{A,B,C,D\}, we define an SS-order as a poset PP that has a representation as follows: each element vv of PP is assigned a unit interval IvI_v of type belonging to SS, and xyx \prec y if and only if either (i) R(x)<c(y)R(x) < c(y) or (ii) R(x)=c(y)R(x) = c(y) and at least one of R(x),c(y)R(x), c(y) is open and at least one of L(y),c(x)L(y), c(x) is open. We characterize several of the classes of SS-orders and provide separating examples between unequal classes. In addition, for each S{A,B,C,D}S \subseteq \{A,B,C,D\} we present a polynomial-time algorithm that recognizes SS-orders, providing a representation when one exists and otherwise providing a certificate showing it is not an SS-order.

Keywords

Cite

@article{arxiv.1707.08099,
  title  = {Tolerance Orders of Open and Closed Intervals},
  author = {Alan Shuchat and Randy Shull and Ann N Trenk},
  journal= {arXiv preprint arXiv:1707.08099},
  year   = {2017}
}

Comments

30 pages, 5 figures

R2 v1 2026-06-22T20:57:08.720Z