Dense halves in balanced 2-partition of K4-free graphs
Abstract
A balanced 2-partition of a graph is a bipartition A,Ac of V(G) such that |A|=|Ac|. Balogh, Clemen, and Lidick\'y conjectured that for every K4-free graph on n (even) vertices, there exists a balanced 2-partition A,Ac such that \e(A),e(Ac)\≤ n2/16 edges. In this paper, we present a family of counterexamples to the conjecture and provide a new upper bound (0.074n2) for every sufficiently large even integer n.
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