Several Conclusions on another site setting problem

Abstract

Let S = \ A1,A2, ·s ,An\ be a finite point set in m-dimensional Euclidean space Em, and\| AiAj \| be the distance between Ai and Aj. Define σ (S) = Σ1 i < j n \| AiAj \| , D(S) = 1 i < j n \ \| AiAj \| \, ω (m,n) = σ (S)D(S), ω (m,n) = \ . σ (S)D(S) |S ⊂ Em,| S | = n \. This paper proves that, for any point P in an n-dimensional simplex A1A2 ·s An + 1 in Euclidean space, Σi = 1n + 1 \| PAi \| <= it,jt ∈ \ 1,2, ·s ,n + 1\ \ Σt = 1n \| AitAjt \| \ By using this inequality and several results in differential geometry this paper also proves that ω (2,4) = 4 + 2 2 - 3 , ω (n,n + 2) >= Cn + 12 + 1 + n 2( 1 - n + 1 2n ) .