Complexes of nearly maximum diameter
Abstract
The diameter of a strongly connected d-dimensional simplicial complex is the diameter of its dual graph. We provide a probabilistic proof of the existence of d-dimensional simplicial complexes with diameter (1d · d! - ( n)-ε) nd. Up to the first order term, this is the best possible lower bound for the maximum diameter of a d-complex on n vertices as a simple volume argument shows that the diameter of a d-dimensional simplicial complex is at most 1d nd. We also find the right first-order asymptotics for the maximum diameter of a d-pseudomanifold on n vertices.
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