摘要
In this paper the Ⅰ and Ⅱ regular n-simplices are introduced. We prove that the sufficient and necessary conditions for existence of an Ⅰ regular n-simplex in Rn are that if n is even then n = 4m(m + 1), and if n is odd then n = 4m + 1 with that n + 1 can be expressed as a sum of two integral squares or n = 4m - 1, and that the sufficient and necessary condition for existence of a Ⅱ regular n-simplex in Rn is n = 2m2 - 1 or n = 4m(m+1)(m 6 N). The connection between regulars-simplex in Rn and combinational design is given.
In this paper the Ⅰ and Ⅱ regular n-simplices are introduced. We prove that the sufficient and necessary conditions for existence of an Ⅰ regular n-simplex in Rn are that if n is even then n= 4m(m + 1), and if n is odd then n= 4m + 1 with that n + 1 can be expressed as a sum of two integral squares or n = 4m - 1, and that the sufficient and necessary condition for existence of a Ⅱ regular n-simplex in Rn is n= 2m2 - 1 or n= 4m(m+1)(m ( ) N). The connection between regular n-simplex in Rn and combinational design is given.
基金
This work was supported by the National Natural Science Foundation of China(Grant No.10171086)
Jiangsu Natural Science Foundation(Grant No.BK2002023)
National Distinguished Youth Science Foundation of China Grant and the 973 Grant.
