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Balanced judicious bipartitions of graphs

✍ Scribed by Baogang Xu; Juan Yan; Xingxing Yu

Publisher
John Wiley and Sons
Year
2009
Tongue
English
Weight
149 KB
Volume
63
Category
Article
ISSN
0364-9024

No coin nor oath required. For personal study only.

✦ Synopsis

Abstract

A bipartition of the vertex set of a graph is called balanced if the sizes of the sets in the bipartition differ by at most one. B. BollobΓ‘s and A. D. Scott, Random Struct Alg 21 (2002), 414–430 conjectured that if G is a graph with minimum degree of at least 2 then V(G) admits a balanced bipartition V~1~, V~2~ such that for each i, G has at most |E(G)|/3 edges with both ends in V~i~. The minimum degree condition is necessary, and a result of B. BollobΓ‘s and A. D. Scott, J. Graph Theory 46 (2004), 131–143 shows that this conjecture holds for regular graphs G(i.e., when Ξ”(G)=Ξ΄(G)). We prove this conjecture for graphs G with \documentclass{article}\footskip=0pc\pagestyle{empty}\begin{document}\begin{eqnarray*}\Delta(G)\le\frac{7}{5}\delta(G)\end{eqnarray*}\end{document}; hence, it holds for graphs ]ensuremathG with \documentclass{article}\footskip=0pc\pagestyle{empty}\begin{document}\begin{eqnarray*}\delta(G)\ge\frac{5}{7}|V(G)|\end{eqnarray*}\end{document}. Β© 2009 Wiley Periodicals, Inc. J Graph Theory 63: 210–225, 2010

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