A Generalization of the Methods of Brass, Harboth, and Nieborg
Abstract
In 1995, Brass, Harborth and Nienborg disproved a conjecture of Erdos when they showed that a C4-free subgraph of the hypercube, Qn, can have at least ( 12 +ω(1))e(Qn) edges. In this paper, we generalize the idea of Brass, Harborth and Nienborg to provide good constructions of Q3-free subgraphs of Qn for some small values of n.
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