Paper Info
Title
L(2,1)-labeling of perfect elimination bipartite graphs
Abstract
An L(2,1)-labeling of a graph G is an assignment of nonnegative integers, called colors, to the vertices of G such that the difference between the colors assigned to any two adjacent vertices is at least two and the difference between the colors assigned to any two vertices which are at distance two apart is at least one. The span of an L(2,1)-labeling f is the maximum color number that has been assigned to a vertex of G by f. The L(2,1)-labeling number of a graph G, denoted as λ(G), is the least integer k such that G has an L(2,1)-labeling of span k. In this paper, we propose a linear time algorithm to L(2,1)-label a chain graph optimally. We present constant approximation L(2,1)-labeling algorithms for various subclasses of chordal bipartite graphs. We show that λ(G)=O(Δ(G)) for a chordal bipartite graph G, where Δ(G) is the maximum degree of G. However, we show that there are perfect elimination bipartite graphs having λ=Ω(Δ2). Finally, we prove that computing λ(G) of a perfect elimination bipartite graph is NP-hard.
Year
DOI
Venue
2011
10.1016/j.dam.2010.07.008
Discrete Applied Mathematics
Keywords
Field
DocType
L(2,1)-labeling,Perfect elimination bipartite graphs,Graph algorithms,NP-complete
Complete bipartite graph,Discrete mathematics,Combinatorics,Vertex-transitive graph,Edge-transitive graph,Graph power,Chordal bipartite graph,Bipartite graph,Distance-hereditary graph,Mathematics,Graph coloring
Journal
Volume
Issue
ISSN
159
16
0166-218X
Citations 
PageRank 
References 
5
0.42
25
Authors
2
Name
Order
Citations
PageRank
B. S. Panda19921.18
Preeti Goel2101.54