Bipartite density of triangle-free subcubic graphs |
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| Authors: | Xuding Zhu |
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| Affiliation: | Department of Applied Mathematics, National Sun Yat-sen University, Kaohsiung, Taiwan National Center for Theoretical Sciences, Taiwan |
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| Abstract: | ![]()
A graph is subcubic if its maximum degree is at most 3. The bipartite density of a graph G is defined as b(G)=max{|E(B)|/|E(G)|:B is a bipartite subgraph of G}. It was conjectured by Bondy and Locke that if G is a triangle-free subcubic graph, then  and equality holds only if G is in a list of seven small graphs. The conjecture has been confirmed recently by Xu and Yu. This note gives a shorter proof of this result. |
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| Keywords: | Triangle-free Subcubic Bipartite density Max-cut |
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