超立方体网络的(d,k)控制数

(d,k)控制数是刻画容错网络中资源共亨可靠性的一个新参数.本文考虑了k维超立方体Qk的(d,k)控制数,得到:γ1,k(Qk)=2k-1(k>1);d=[k/2]+1(k>2)时,γd,k(Qk)=2;d≤[k/2](k≥4)时,3≤γd,k(Qk)≤2k-d+1;以及若d为正整数,且[k/d]=[k/(d-1)]+1,则γd,k(Qk)=γd,k(Qk),其中[k/d].d+1≤k1≤k.

关于金字塔网的限制连通度与(l,k)控制数

金字塔网是并行计算、图像处理的一种很重要的网络拓扑结构,考察了一些金字塔网 的性质,给出它的限制连通度及(l,k)控制数.

超立方体网络的(d,k)独立数和(d,k)控制数

(d,k)独立数和(d,k)控制数是分析互连网络性能的重要参数.主要确定了k维超立方体网络的(k-t,k)独立数等于2,如果0≤3t≤k-4,以及(2,k)控制数为2k,如果k≥3.该结论推广了参考文献[6]中的结果,他们的结果(参考文献[6]中的定理3和定理4)是本文定理2当t=0和t=1时的特例.

2维无向超环面网的控制数

(d,k)控制数是用来刻画容错网络中资源共享可靠性的一个新参数,吕长虹和张克民得到：d=d (C(d_1,d_2,L,d_n))-1时,n维超环面网C(d_1,d_2,L,d_n)≠C(3,3,L,3)的(d,2n)控制数为2(n≥3,d_i≥3,i∈{0,1,L,n}),本文得到：2维无向超环面网C(d_1,3)的(d,4)控制数为2,如果d_4(C(d_1,3))-(m-2)＜d＜d_4(C (d_1,3))-1。

On total{k}-domatic number of Cartesian and direct product of graphs

For a positive integer k,the total{k}-dominating function(T{k}DF)of a graph G without isolated vertices is a function f from the vertex set V(G)to the set{0,1,2,…,k}such that for each vertex v∈V(G),the sum of the values of all its neighbors assigned by f is at least k.A set{f_(1),f_(2),…,f_(d)}of pairwise different T{k}DF s of G with the property that∑d i=1 f_(i)(v)≤k for each v∈V(G),is called a total{k}-dominating family(T{k}D family)of G.The total{k}-domatic number of a graph G,denoted by d^({k})_(t)(G),is the maximum number of functions in T{k}D family.In 2013,Aram et al.proposed a problem that whether or not d^({k})_(t)(C_(m)□C_(n))=3 when 4 nmk,and d^({k})_(t)(C m□C n)=4 when 4|nmk.It was shown that d^({k})_(t)(C_(m)□C_(n))=3 if 4 nmk and k≥2 or 4|nmk and 2 nk,which partially answered the above problem.In addition,the total{k}-domatic number of the direct product of a cycle and a path,two paths,and two cycles was studied,respectively.