On the probability of n equidistant points in high-dimensional lattices
Abstract
Consider n d-dimensional vectors with iid entries from a lattice distribution X. We show that the probability that all distances between them are equal is asymptotically \[ Cn·1d(m-1)/2 for d ∞ and m = n2, \] with an explicit constant in terms of the first 4 moments of X. Moreover, we generalise this result to encompass all finitely supported X, as well as under different distances. Our method relies on the relatively rarely used multidimensional local limit theorem and an analysis of the lattice on Zn2 spanned by the image of the overlapping map \[ H : \0,1\n \0,1\n2, (v1, …, vn) ( 1\vi ≠ vj\ )1 i < j n. \]
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