Confining the Robber on Cographs
Abstract
In this paper, the notions of {\em trapping} and {\em confining} the robber on a graph are introduced. We present some structural necessary conditions for graphs not containing the path on vertices (referred to as -free graphs) for some , so that cops do not have a strategy to capture or confine the robber on . Utilizing such conditions, we show that for planar cographs and planar -free graphs the confining cop number is at most one and two, respectively. It is also shown that the number of vertices of a connected cograph on which one cop does not have a strategy to confine the robber has a tight lower-bound of eight. We also explore the effects of twin operations -- which are well known to provide a characterization of cographs -- on the number of cops required to capture or confine the robber on cographs. We conclude by posing two conjectures concerning the confining cop number of -free graphs and the smallest planar graph of confining cop number of three.
Cite
@article{arxiv.2006.08941,
title = {Confining the Robber on Cographs},
author = {Masood Masjoody},
journal= {arXiv preprint arXiv:2006.08941},
year = {2020}
}
Comments
16 pages, 9 figures