Path covering number and L(2,1)-labeling number of graphs

TL;DR

This paper investigates the path covering number and L(2,1)-labeling number of graphs, extending previous results and resolving an open problem related to graph labelings with distance constraints.

Contribution

It extends existing results on graph labelings and addresses an open problem concerning the structure of graphs with non-surjective L(2,1)-labelings.

Findings

Extended results from previous studies on graph labelings.

Provided solutions to an open problem on graph structure.

Analyzed relationships between path covering and L(2,1)-labeling numbers.

Abstract

A {\it path covering} of a graph $G$ is a set of vertex disjoint paths of $G$ containing all the vertices of $G$. The {\it path covering number} of $G$, denoted by $P(G)$, is the minimum number of paths in a path covering of $G$. An {\sl $k$-L(2,1)-labeling} of a graph $G$ is a mapping $f$ from $V(G)$ to the set ${0,1,...,k}$ such that $|f(u)-f(v)|\ge 2$ if $d_G(u,v)=1$ and $|f(u)-f(v)|\ge 1$ if $d_G(u,v)=2$. The {\sl L(2,1)-labeling number $\lambda (G)$} of $G$ is the smallest number $k$ such that $G$ has a $k$-L(2,1)-labeling. The purpose of this paper is to study path covering number and L(2,1)-labeling number of graphs. Our main work extends most of results in [On island sequences of labelings with a condition at distance two, Discrete Applied Maths 158 (2010), 1-7] and can answer an open problem in [On the structure of graphs with non-surjective L(2,1)-labelings, SIAM J. Discrete Math. 19 (2005), 208-223].