Search

Your search keyword '"Sun, Pak Kiu"' showing total 18 results
Start Over Author "Sun, Pak Kiu" Search Limiters Academic (Peer-Reviewed) Journals
18 results on '"Sun, Pak Kiu"'

1. On the anti-Kelul\'{e} problem of cubic graphs

Author

Li, Qiuli, Shiu, Wai Chee, Sun, Pak Kiu, and Ye, Dong

Subjects
Mathematics - Combinatorics
Abstract

An edge set $S$ of a connected graph $G$ is called an anti-Kekul\'e set if $G-S$ is connected and has no perfect matchings, where $G-S$ denotes the subgraph obtained by deleting all edges in $S$ from $G$. The anti-Kekul\'e number of a graph $G$, denoted by $ak(G)$, is the cardinality of a smallest anti-Kekul\'e set of $G$. It is NP-complete to find the smallest anti-Kekul\'e set of a graph. In this paper, we show that the anti-Kekul\'{e} number of a 2-connected cubic graph is either 3 or 4, and the anti-Kekul\'{e} number of a connected cubic bipartite graph is always equal to 4. Furthermore, a polynomial time algorithm is given to find all smallest anti-Kekul\'{e} sets of a connected cubic graph., Comment: 14 pages, 3 figures

Published
2017

2. A characterization of L(2, 1)-labeling number for trees with maximum degree 3

Author

Chen, Dong, Shiu, Wai Chee, Shu, Qiaojun, Sun, Pak Kiu, and Wang, Weifan

Subjects
Mathematics - Combinatorics
Abstract

An L(2, 1)-labeling of a graph is an assignment of nonnegative integers to the vertices of G such that adjacent vertices receive numbers differed by at least 2, and vertices at distance 2 are assigned distinct numbers. The L(2, 1)-labeling number is the minimum range of labels over all such labeling. It was shown by Griggs and Yeh [Labelling graphs with a condition at distance 2, SIAM J. Discrete Math. 5(1992), 586-595] that the L(2, 1)-labeling number of a tree is either \D+ 1 or \D + 2. In this paper, we give a complete characterization of L(2, 1)-labeling number for trees with maximum degree 3.

Published
2015

3. A relation between Clar covering polynomial and cube polynomial

Author

Zhang, Heping, Shiu, Wai-Chee, and Sun, Pak-Kiu

Subjects
Mathematics - Combinatorics, 05C31
Abstract

The Clar covering polynomial (also called Zhang-Zhang polynomial in some chemical literature) of a hexagonal system is a counting polynomial for some types of resonant structures called Clar covers, which can be used to determine Kekul\'e count, the first Herndon number and Clar number, and so on. In this paper we find that the Clar covering polynomial of a hexagonal system H coincides with the cube polynomial of its resonance graph R(H) by establishing a one-to-one correspondence between the Clar covers of H and the hypercubes in R(H). Accordingly, some applications are presented., Comment: 16 pages, 3 figures

Published
2012

4. Some Results on incidence coloring, star arboricity and domination number

Author

Sun, Pak Kiu and Shiu, Wai Chee

Subjects
Mathematics - Combinatorics, 05C15, 05C69
Abstract

Two inequalities bridging the three isolated graph invariants, incidence chromatic number, star arboricity and domination number, were established. Consequently, we deduced an upper bound and a lower bound of the incidence chromatic number for all graphs. Using these bounds, we further reduced the upper bound of the incidence chromatic number of planar graphs and showed that cubic graphs with orders not divisible by four are not 4-incidence colorable. The incidence chromatic numbers of Cartesian product, join and union of graphs were also determined., Comment: 8 pages

Published
2012

5. Incidence coloring of Regular graphs and Complement graphs

Author

Sun, Pak Kiu

Subjects
Mathematics - Combinatorics, 05C15, 05C69
Abstract

Using a relation between domination number and incidence chromatic number, we obtain necessary and sufficient conditions for $r$-regular graphs to be $(r+1)$-incidence colorable. Also, we determine the optimal Nordhaus-Gaddum inequality for the incidence chromatic number., Comment: This paper have been withdrawn since the article to appear in Taiwanese Journal of Mathematics and it will offense the rules

Published
2012

14. The signless Laplacian spectral radius of k -connected irregular graphs.

Author

Shiu, Wai Chee, Huang, Peng, and Sun, Pak Kiu

Subjects
LAPLACIAN matrices, SPECTRAL theory, GRAPH theory, GRAPH connectivity, MATHEMATICAL bounds
Abstract

LetGbe ak-connected irregular graph of ordern, sizemand maximum degree. Letbe the signless Laplacian spectral radius ofG. In this article, we prove the following lower bound on: Moreover, we determine similar bounds for the signless Laplacian spectral radius of proper spanning subgraphs andk-edge-connected graphs. [ABSTRACT FROM PUBLISHER]

Published
2017
Full Text
View/download PDF

Catalog

Books, media, physical & digital resources
See catalog results