Decomposing Graphs of High Minimum Degree into 4‐Cycles Journal Articles

abstract

• AbstractIf a graph G decomposes into edge‐disjoint 4‐cycles, then each vertex of G has even degree and 4 divides the number of edges in G. It is shown that these obvious necessary conditions are also sufficient when G is any simple graph having minimum degree at least , where n is the number of vertices in G. This improves the bound given by Gustavsson (PhD Thesis, University of Stockholm, 1991), who showed (as part of a more general result) sufficiency for simple graphs with minimum degree at least . On the other hand, it is known that for arbitrarily large values of n there exist simple graphs satisfying the obvious necessary conditions, having n vertices and minimum degree , but having no decomposition into edge‐disjoint 4‐cycles. We also show that if G is a bipartite simple graph with n vertices in each part, then the obvious necessary conditions for G to decompose into 4‐cycles are sufficient when G has minimum degree at least .

authors

• Bryant, Dianne
• Cavenagh, Nicholas J

status

• published 

publication date

• July 2015

has subject area

• Computation Theory & Mathematics (Science Metrix)

published in

• Journal of Graph Theory  Journal

keywords

• LEAVES
• Mathematics
• Physical Sciences
• SYSTEMS
• Science & Technology
• cycle decomposition
• graph decomposition

Digital Object Identifier (DOI)

• 10.1002/jgt.21816

start page

• 167

end page

• 177

volume

• 79

issue

• 3