Distance two labeling of some products of graphs

Wu, Qiong

01 January 2013

No description available.

Graph labelings

Graph theory

Almost regular graphs and edge-face colorings of plane graphs

Macon, Lisa Fischer.

January 2009

Thesis (Ph.D.)--University of Central Florida, 2009. / Adviser: Yue Zhao. Includes bibliographical references (p. 102-104).

Graph theory. Graph coloring.

Approximate edge 3-coloring of cubic graphs

Gajewar, Amita Surendra.

January 2008

Thesis (M. S.)--Computing, Georgia Institute of Technology, 2009. / Committee Chair: Prof. Richard Lipton; Committee Member: Prof. Dana Randall; Committee Member: Prof. H. Venkateswaran. Part of the SMARTech Electronic Thesis and Dissertation Collection.

Graph algorithms. Graph coloring.

Methods for Planarizing Graphs

Liebers, Annegret.

January 2001

Konstanz, Univ., Diplomarb., 1996.

Graph. Planarer Graph. Algorithmus.

Graph minors and Hadwiger's conjecture

Micu, Eliade Mihai,

January 2005

Thesis (Ph. D.)--Ohio State University, 2005. / Title from first page of PDF file. Document formatted into pages; contains viii, 80 p.; also includes graphics. Includes bibliographical references (p. 80). Available online via OhioLINK's ETD Center

Graph coloring. Graph theory.

Full friendly index sets of cartesian product of two cycles

Ling, Man Ho

01 January 2008

No description available.

Graph labelings

Graph theory

Full friendly index sets of Cartesian products of cycles and paths

Wong, Fook Sun

01 January 2010

No description available.

Graph labelings

Graph theory

Circular chromatic numbers and distance two labelling numbers of graphs

Lin, Wensong

01 January 2004

No description available.

Graph labelings

Graph theory

Incidence coloring : origins, developments and relation with other colorings

Sun, Pak Kiu

01 January 2007

No description available.

Graph coloring

Graph theory

Distance-two constrained labeling and list-labeling of some graphs

Zhou, Haiying

01 January 2013

The distance-two constrained labeling of graphs arises in the context of frequency assignment problem (FAP) in mobile and wireless networks. The frequency assignment problem is the problem of assigning frequencies to the stations of a network, so that interference between nearby stations is avoided or minimized while the frequency reusability is exploited. It was first formulated as a graph coloring problem by Hale, who introduced the notion of the T-coloring of a graph, and that attracts a lot of interest in graph coloring. In 1988, Roberts proposed a variation of the channel assignment problem in which “close transmitters must receive different channels and “very close transmitters must receive channels at least two apart. Motivated by this variation, Griggs and Yeh first proposed and studied the L(2, 1)-labeling of a simple graph with a condition at distance two. Because of practical and theoretical applications, the interest for distance-two constrained labeling of graphs is increasing. Since then, many aspects of the problem and related problems remain to be further explored. In this thesis, we first give an upper bound of the L(2, 1)-labeling number, or simply λ number, for a special class of graphs, the n-cubes Qn, where n = 2k k 1. Chang et al. [3] considered a generalization of L(2, 1)-labeling, namely, L(d, 1)- labeling of graphs. We study the L(1, 1)-labeling number of Qn. A lower bound onλ1(Qn) is provided and λ1(Q2k1) is determined. As a related problem, the L(2, 1)-choosability of graphs is studied. Vizing [17] and Erdos et al. [18] generalized the graph coloring problem and introduced the list coloring problem independently more than three decades ago. We shall consider a new variation of the L(2, 1)-labeling problem, the list-L(2, 1)-labeling problem. We determine the L(2, 1)-choice numbers for paths and cycles. We also study the L(2, 1)- choosability for some special graphs such as the Cartesian product graphs and the generalized Petersen graphs. We provide upper bounds of the L(2, 1)-choice numbers for the Cartesian product of a path and a spider, also for the generalized Petersen graphs. Keywords: distance-two labeling, λ-number, L(2, 1)-labeling, L(d, 1)-labeling, list-L(2, 1)-labeling, choosability, L(2, 1)-choice number, path, cycle, n-cube, spider, Cartesian product graph, generalized Petersen graph.

Graph theory

Graph labelings