分支图 meaning in Chinese
branching diagram
Examples
- Since the crossing numbers of graph equal the sum of the crossing numbers of all its 2 - connected blocks , we work on the crossing numbers of graphs for n < 9 with unique 2 - connected block .
由于图的交叉数等于其所有二连通分支的交叉数的和,本文计算了n 9的所有单二连通分支图的交叉数。 - Firstly , we give the bifurcation diagram in the parameter plane ( r , b ) , according to which we can give the stable and unstable regions of the equation ' s / oro solution and the hopf bifurcated curve of hopf bifurcation in the parameter plane ( r , b )
我们首先在( r , b )参数平面内给出一张分支图,根据此图能够给出在( r , b )参数严面内方程零解的稳定性和不稳定性区域,以及方程产生hopf分支的hopf分支曲线。 - In this paper , three correlative results are given : 1 ) the average crossing number of graph with n vertices and q edges can be signified approximately by quadratic equation of q . 2 ) the average crossing number of graphs with bigger girth is greater than that with smaller girth within given vertices and edges . 3 ) the average crossing number of r - regular graphs greater than that of non - regular graphs within given vertices and edges where n is odd or r < n / 2
并得出相关的规律: 1 ) n个顶点q条边的单二连通分支图的平均交叉数aac ( n , q )可近似地表示为q的二次多项式, 2 )在给定顶点数n与边数q的单二连通分支图中围长较大的图的平均交叉数大于围长较小的图的平均交叉数, 3 )在给定顶点数n与边数q的单二连通分支图中当n为奇数或r n / 2时, r正则图的平均交叉数大于非r正则图的平均交叉数。 - Based on the amount of terpenoids in illicium , put various kinds of terpenoids in order by affiliated basic skeleton , the total contents of terpenoids in various kinds of basic skeleton type as the quantity property , utilized cluster analysis via spss and drew dendrogram of illicium
摘要以八角属植物中所含的萜类成分为基础,把各种萜类成分按照其所属的基本骨架类型进行整理,将各种骨架类型萜类的总含量作为数量性状,采用spss系统进行聚类分析研究,作出八角属的树形分支图。