1) small degree
小次
1.
The definition of small degree and large degree is given, and it is used to study the edge reconstructions of graphs, and two results are obtained.
提出图的小次、大次和特殊路长S(G)等概念来研究图的边重构性,并得到如下两个重要结论:若图G存在次为δ_p+k的顶点至少和k+1个小次顶点相邻,则G是边可重构的(δ_p为某小次,k为非负整数);若S(G)≠0,3,+∞,则G是边可重构的。
2) sub-minimum
次小元素
3) fraction order
小数级次
1.
By means of thefraction orders of interference fringe shifted, the number of integral orders of interfer-ence fringe shifted can be counted or the displacement can be measured directly.
介绍基于等倾光干涉原理测量位移量中,以最终条纹仪化的小数级次计量整数级次,或直接计量位移量的小数计数理论。
4) subminimum sub
次极小子
1.
Submaxinal sub of and subminimum sub of the sub structure are introduced,their proparties are given,and the decomposition theorems are abtained as follows: every sub of sub structure can be decomposed as intersection(union) of some submaxinal(subminimum) subs.
在子结构中引入了次极大子和次极小子的概念,讨论了它们的性质,并得到子的如下分解定理:子结构中的任一子都可表示为一些次极大(小)子的交(并),特别地,在满足子降链条件的子结构中,每个子都可表示为有限个次极大子的交。
5) weak minimal order
次最小阶
1.
In this paper,the authors discussed connected residually complete graphs,determined the third minimal order of connected K_2residual graphs,for n≠2 the weak minimal order of connected K_n-residual graphs,that ismin{v(G)|G is connected K_n-residual graph,v(G)>2n+2}=2n+3,n=2,4,62n+4,n≠2,4,6and constructed the corresponding graphs.
讨论连通的残差完备图,确定了连通的K2残差图的第二个最小阶及n≠2时,连通的Kn残差图的次最小阶,即min{v(G)|G是连通的Kn残差图,v(G)>2n+2}=2n+3,n=2,4,62n+4,n≠2,4,6并且构造了对应的残差完备图;同时证明了n=6时,C5[K3]是唯一的2n+3阶的连通Kn残差图,还对任意正整数n和k,构造了具有2n+2k阶的残差完备图。
6) subleast element
次小元
1.
In this paper, the concept of dangerous signal recognition lattices is proposed, some relative concepts, such as subgreatest element, subleast element, heart and shall, are introduced, the basic properties are discussed, several examples are constructed.
建立了险象识别格的概念,并引进次大元,次小元,心脏,外壳,Boole型子格等相关概念,讨论其基本性质并给出若干例子,从而为进一步研究险象识别逻辑做好了准备。
补充资料:"次大口径"管道
见"大口径"管道。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
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