1) vesicle shapes of high topological genus
高亏格膜泡形状
2) Vesicles
膜泡形状
1.
Research on Vesicles by Numerical Method
数值解法研究生物膜泡形状
3) higher topological genus
高拓扑亏格
4) bubble geometry
膜泡外形
5) bubble shape
气泡形状
1.
The comparison of the variation of bubble shape and volume during bubble growing process between the two kinds of solutions was made.
采用激光成像结合CCD摄像技术分别对牛顿及非牛顿流体(甘油和羧甲基纤维素钠水溶液)中的气泡生成行为进行了研究,对2种流体气泡生成过程中气泡形状和体积变化进行了比较。
2.
The results for single bubble show that, in low-viscosity liquids, the bubble shows large distortion and oscillation, the bubble shape changes from the spherical shape to the irregular ellipsoid and the bubble rising trajectory changes from a rectilinear path to a zigzag or spiral path as the bubble equivalent diameter increases.
对单个气泡的研究结果表明,在低黏度液体中,随着气泡直径的增加,气泡振荡形变剧烈,气泡形状由球形向类似椭球形的不规则形状转变,上升轨迹由直线形向之字形、螺旋形转变;在高黏度液体中,随气泡直径的增加,气泡形状逐渐由球形向呈球帽形转变,气泡的周期性振荡趋于平缓,纵横比增大,气泡上升速度降低。
3.
The bubble shape and rise velocity predicted by the simulation agree well with a well-known bubble regime diagram in the literature.
针对Eo数从O(0)~O(2),Mo数从O(11)~O(2)的流动范围,重点研究了上升气泡的形状特性,并与经典的气泡形状图谱进行了比较。
6) genus
[英]['dʒi:nəs] [美]['dʒinəs]
亏格
1.
On 3-connected cubic graphs whose maximum genus attains the lower bound;
关于最大亏格达到下界的三连通三正则简单图(英文)
2.
In this paper,on the basis of joint trees introduced by Yanpei Liu and by dividing the associated surfaces into segments layer by layer,we show that the genus of K5*eK5*e…*eK5 is 「n/2」, where n is the number of K5.
3)的亏格为「n/2﹁。
3.
At the basis of joint trees introduced by Yanpei Liu, by using the method which sorts the embedding surfaces of these graphs,the genus distribution of the orientable embeddings for a type of new graphs are provided.
在刘彦佩提出的联树法的基础上,通过分类一类新图类的可定向嵌入曲面求出了这类图类的可定向嵌入的亏格分布。
补充资料:拓扑结构(拓扑)
拓扑结构(拓扑)
topologies 1 structure (topology)
拓扑结构(拓扑)【t哪d哈eal structure(to和如罗);TO-no“orHtlec~cTpyKTypa」,开拓扑(oPen to和fogy),相应地,闭拓扑(closed topofogy) 集合X的一个子集族必(相应地居),满足下述J胜质: 1.集合x,以及空集叻,都是族。(相应地容)的元素. 2。(相应地2劝.。中有限个元素的交集(相应地,居中有限个元素的并集),以及已中任意多个元素的并集(相应地,居中任意多个元素的交集),都是该族中的元素. 在集合X上引进或定义了拓扑结构(简称拓扑),该集合就称为拓扑空间(topological sPace),其夕。素称为.l5(points),族份(相应地居)中元素称为这个拓扑空问的开(open)(相应地,闭(closed))集. 若X的子集族份或莎之一已经定义,并满足性质l及2。。(或相应地l及2衬,则另一个族可以对偶地定义为第一个集族中元素的补集族. fl .C .A二eKeaH及pos撰[补注1亦见拓扑学(zopolo群);拓扑空l’ed(toPo1O廖-c:,l印aee);一般拓扑学(general toPO】ogy).
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条