Affiliation:
1. School of Mathematics and Statistics, Huanghuai University, Zhumadian 463000, China
2. Department of Mathematics, West Virginia University, Morgantown, WV 26506, USA
Abstract
The cutwidth of a graph G is the smallest integer k (k≥1) such that the vertices of G are arranged in a linear layout [v1,v2,...,vn], in such a way that for each i=1,2,...,n−1, there are at most k edges with one endpoint in {v1,v2,...,vi} and the other in {vi+1,...,vn}. The cutwidth problem for G is to determine the cutwidth k of G. A graph G with cutwidth k is k-cutwidth critical if every proper subgraph of G has a cutwidth less than k and G is homeomorphically minimal. In this paper, except five irregular graphs, other 4-cutwidth critical graphs were resonably classified into two classes, which are graph class with a central vertex v0, and graph class with a central cycle Cq of length q≤6, respectively, and any member of two graph classes can skillfuly achieve a subgraph decomposition S with cardinality 2, 3 or 4, where each member of S is either a 2-cutwith graph or a 3-cutwidth graph.
Funder
the Soft Science Foundation of the Henan Province of China
the Science and Technology Key Project of the Henan Province of China
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
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