Let S={A1,A2,⋯,An} be a finite point set in m-dimensional Euclidean space Em, and∥AiAj∥ be the distance between Ai and Aj. Define σ(S)=1≤i<j≤n∑∥AiAj∥, D(S)=1≤i<j≤nmax{∥AiAj∥}, ω(m,n)=D(S)σ(S), supω(m,n)=max{D(S)σ(S)S⊂Em,∣S∣=n}. This paper proves that, for any point P in an n-dimensional simplex A1A2⋯An+1 in Euclidean space, i=1∑n+1∥PAi∥ <= it,jt∈{1,2,⋯,n+1}sup{t=1∑n∥AitAjt∥} By using this inequality and several results in differential geometry this paper also proves that supω(2,4)=4+22−3, supω(n,n+2) >= Cn+12+1+n2(1−2nn+1).
@article{arxiv.1806.01645,
title = {Several Conclusions on another site setting problem},
author = {Yuyang Zhu},
journal= {arXiv preprint arXiv:1806.01645},
year = {2018}
}