English

On the isometric path partition problem

Combinatorics 2018-08-29 v1

Abstract

The isometric path cover (partition) problem of a graph is to find a minimum set of isometric paths which cover (partition) the vertex set of the graph. The isometric path cover (partition) number of a graph is the cardinality a minimum isometric path cover (partition). We prove that the isometric path partition problem and the isometric kk-path partition problem for k3k\geq 3 are NP-complete on general graphs. Fisher and Fitzpatrick \cite{FiFi01} have shown that the isometric path cover number of (r×r)(r\times r)-dimensional grid is 2r/3\lceil 2r/3\rceil. We show that the isometric path cover (partition) number of (r×s)(r\times s)-dimensional grid is ss when rs(s1)r \geq s(s-1). We establish that the isometric path cover (partition) number of (r×r)(r\times r)-dimensional torus is rr when rr is even and is either rr or r+1r+1 when rr is odd. Then, we demonstrate that the isometric path cover (partition) number of an rr-dimensional Benes network is 2r2^r. In addition, we provide partial solutions for the isometric path cover (partition) problems for cylinder and multi-dimensional grids.

Keywords

Cite

@article{arxiv.1808.09097,
  title  = {On the isometric path partition problem},
  author = {Paul Manuel},
  journal= {arXiv preprint arXiv:1808.09097},
  year   = {2018}
}

Comments

This is a part of a proposed research project of Kuwait University, Kuwait. The author will appreciate to receive your comments and constructive criticism on this initial draft. The author's contact address is pauldmanuel@gmail.com

R2 v1 2026-06-23T03:45:32.420Z