English

Several Conclusions on another site setting problem

General Mathematics 2018-06-06 v1

Abstract

Let S={A1,A2,,An}S = \{ {A_1},{A_2}, \cdots ,{A_n}\} be a finite point set in m-dimensional Euclidean space Em{E^m}, andAiAj\left\| {{A_i}{A_j}} \right\| be the distance between AiA_i and AjA_j. Define σ(S)=1i<jnAiAj\sigma (S) = \sum\limits_{1 \le i < j \le n} {\left\| {{A_i}{A_j}} \right\|} , D(S)=max1i<jn{AiAj}D(S) = \mathop {\max }\limits_{1 \le i < j \le n} \left\{ {\left\| {{A_i}{A_j}} \right\|} \right\}, ω(m,n)=σ(S)D(S)\omega (m,n) = \frac{{\sigma (S)}}{{D(S)}}, supω(m,n)=max{σ(S)D(S)SEm,S=n}\sup \omega (m,n) = \max \left\{ {\left. {\frac{{\sigma (S)}}{{D(S)}}} \right|S \subset {E^m},\left| S \right| = n} \right\}. This paper proves that, for any point P in an n-dimensional simplex A1A2An+1{A_1}{A_2} \cdots {A_{n + 1}} in Euclidean space, i=1n+1PAi\sum\limits_{i = 1}^{n + 1} {\left\| {P{A_i}} \right\|} <= supit,jt{1,2,,n+1}{t=1nAitAjt}\mathop {\sup }\limits_{{i_t},{j_t} \in \{ 1,2, \cdots ,n + 1\} } \left\{ {\sum\limits_{t = 1}^n {\left\| {{A_{{i_t}}}{A_{{j_t}}}} \right\|} } \right\} By using this inequality and several results in differential geometry this paper also proves that supω(2,4)=4+223\sup \omega (2,4) = 4 + 2\sqrt {2 - \sqrt 3 } , supω(n,n+2)\sup \omega (n,n + 2) >= Cn+12+1+n2(1n+12n)C_{n + 1}^2 + 1 + n\sqrt {2\left( {1 - \sqrt {{\textstyle{{n + 1} \over {2n}}}} } \right)} .

Keywords

Cite

@article{arxiv.1806.01645,
  title  = {Several Conclusions on another site setting problem},
  author = {Yuyang Zhu},
  journal= {arXiv preprint arXiv:1806.01645},
  year   = {2018}
}

Comments

10 pages

R2 v1 2026-06-23T02:19:36.154Z