Tolerance Orders of Open and Closed Intervals
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 in which the interval endpoints ( and ) may be open or closed as well as the center point (). This yields four types of intervals: (endpoints and center points closed), (endpoints and center points open), (endpoints closed, center points open), and (endpoints open, center points closed). For any non-empty subset of , we define an -order as a poset that has a representation as follows: each element of is assigned a unit interval of type belonging to , and if and only if either (i) or (ii) and at least one of is open and at least one of is open. We characterize several of the classes of -orders and provide separating examples between unequal classes. In addition, for each we present a polynomial-time algorithm that recognizes -orders, providing a representation when one exists and otherwise providing a certificate showing it is not an -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