Tight Bounds for Hypercube Minor-Universality
Abstract
Benjamini, Kalifa and Tzalik recently proved that there is an absolute constant c>0 such that any graph with at most c·2d/d edges and no isolated vertices is a minor of the d-dimensional hypercube Qd, while there is an absolute constant K > 0 such that Qd is not (K·2d/d)-minor-universal. We show that Qd does not contain 3-uniform expander graphs with C·2d/d edges as minors. This matches the lower bound up to a constant factor and answers one of their questions.
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