The graph theory general position problem on some interconnection networks
Combinatorics
2017-10-03 v1
Abstract
Given a graph , the (graph theory) general position problem is to find the maximum number of vertices such that no three vertices lie on a common geodesic. This graph invariant is called the general position number (gp-number for short) of and denoted by . In this paper, the gp-number is determined for a large class of subgraphs of the infinite grid graph and for the infinite diagonal grid. To derive these results, we introduce monotone-geodesic labeling and prove a Monotone Geodesic Lemma that is in turn developed using the Erd\"os-Szekeres theorem on monotone sequences. The gp-number of the 3-dim infinite grid is bounded. Using isometric path covers, the gp-number is also determined for Bene\v{s} networks.
Keywords
Cite
@article{arxiv.1710.00244,
title = {The graph theory general position problem on some interconnection networks},
author = {Paul Manuel and Sandi Klavžar},
journal= {arXiv preprint arXiv:1710.00244},
year = {2017}
}