Erdos's diameter conjecture for separated distances fails in high dimensions
Abstract
Erdos asked whether every n-point set in Euclidean space whose n2 pairwise distances are mutually at least 1 apart must have diameter at least (1+o(1))n2. We disprove this statement by constructing for every prime power q a set Xq⊂ Rq2+q of n=q+1 points such that all pairwise distances in Xq are mutually at least 1 apart, while diam( Xq)(1-1π2+o(1))n2. The proof is fully formalized in Lean 4.
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