1) quasi-quotient group
拟商群
2) qusi-L-quotient group
拟L商群
3) quasi-fuzzy factor group
拟Fuzzy商群
1.
In this paper,we will discuss the rationality of concept of fuzzy power groups, and research fuzzy power groups under much weaker conditions,and the most results with respect to quasi-fuzzy factor groups can be obtained when fuzzy monoid is weakened to idempotent fuzzy semi-group.
首先讨论了Fuzzy幂群定义的合理性,其次在更弱的条件下研究了拟Fuzzy商群及其同态关系,将Fuzzy幺半群降低为幂等Fuzzy半群,同样可以得到笔者以前所获的大部分结论。
4) pseudo-fuzzy quotient group
伪拟Fuzzy商群
1.
In this paper, the homomorphism and isomorphism of pseudo-fuzzy quotient groups will be consideredin detail, some interesting results are obtained.
较为详细讨论了伪拟Fuzzy商群的同态同构关系,获得一些有趣的结果。
5) Factor group
商群
1.
The factor group symmetry analysis method was used to calculate the Raman spectra of Nd:GdVO_4(NGV) crystal.
根据商群对称性分析法对Nd:GdVO4(简称NGV)晶体的Raman光谱做了理论计算,测量了NGV不同配置下的Raman光谱。
2.
The factor group symmetry analysis method and position symmetry analysis method were used to analyse the Raman spectra of Nd:YVO 4(NYV) crystal.
根据商群对称性分析法和位置群分析法分别对Nd :YVO4 (简称NYV)晶体的Raman光谱做了理论计算 ,得到了不同的结果 。
3.
The vibration spectrum of CaWO 4 crystal was analyzed theoretically by means of factor group method in this paper.
本文借助商群方法对CaWO4 晶体的振动谱进行了理论分析 ,明确地指出了红外吸收光谱 (IR)和喇曼散射光谱 (R)的激活结果。
6) quotient group
商群
1.
Structure of powers of augmentation ideals and their quotient groups for integral group rings of dihedral groups;
二面体群整群环的n次增广理想及其商群结构
2.
For certain finite group with a perfect normal subgroup,this paper discusses the problem of its augmentation ideals and quotient groups.
本文研究了一类具有完全正规子群的有限群之增广理想及增广商群结构的问题。
3.
Finally,relationship between the quotient group of Rn(x) and the additive group R and relationship between the quotient group of Rn(x) and the product group R\{0} are given.
证明了(Rn(x),*)是交换群并给出几个特殊的正规子群,最后给出了Rn(x)的商群与加群R以及Rn(x)的商群与乘群R\{0}之间的关系。
补充资料:分配拟群
分配拟群
distributive quasi -group
分配拟群「业众面心锐q脚目一g川甲;及.eT一6yT二。a.Kna3llrPynoa] 满足左及右分配律 x·yz=义夕·淞,yz·x=yx·zx的拟群(ql姚i一gro叩).拟群中这两个分配律是互相独立的(存在左分配拟群但不是右分配拟群(【1】)).可引用有理数集Q作为分配拟群的例子,其运算是(x+y)/2.任何幂等中间拟群(认劝加切tn盆d词q姆i-grouP,即拟群Q,其中关系式尹“x及xy·训=郑·夕。对所有x,y,。,。任Q都成立)是分配拟群,一般情形下,每个分配拟群Q(·)同痕(切topy)于某个交换的M门血嗯么拟群(Moul触ngfoOP)(【31).分配拟群的共生拟群(paxas加Phy)(对于逆运算构成的拟群匆uasi一grouP”也是分配拟群且合痕于同一个交换的M otd汕g么拟群.设分配拟群中的四个元素a,b,c,d适合中间律(n址djal hw):曲·cd“ac·掀,则它们生成中间子拟群,特别地,分配拟群中任何三元家生成中间子拟群.在子拟群中平移是自同构,且在某种意义上,分配拟群是齐性的:没有元素和子拟群是特殊的.由有限分配拟群的全部右平移生成的群是可解群(【4]).【补注】陈l]中证明了阶为片…式‘的拟群(其中几为不同的素数,久是非负整数)皆同构于分配拟群Q:,…,Q*的直积,其中Q‘具有阶广且当八笋3时是Ab日拟群(即满足的·扭=禽·掀).
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