The number of regular simplices in higher dimensions
Abstract
We study the extremal function Skd(n), defined as the maximum number of regular (k-1)-simplices spanned by n points in Rd. For any fixed d≥2k≥6, we determine the asymptotic behavior of Skd(n) up to a multiplicative constant in the lower-order term. In particular, when k=3, we determine the exact value of S3d(n), for all even dimensions d≥6 and sufficiently large n. This resolves a conjecture of Erdos in a stronger form. The proof leverages techniques from hypergraph Tur\'an theory and linear algebra.
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