1) normal radical
正规根
1.
The normal radical was introduced for Гrings and this radical is a special radical of Гring is proved.
对Г环引进了正规根,证明了它是特殊根,建立了Γ环M,M的右算子环R=〔Г,M〕,矩阵Гn,m环Mm,n,M环Г及环M2=RГML的正规根之间的关
2) normal antisimple radical
正规反单根
1.
This paper introduces the normal antisimple radical,proving it a special radi-cal and determines the relatioi1ships between the normal antisimple radicals of Г-ring M, theright operator ring R=[Г,M]of M and the matrix Г_(n,m)-ring M_(m,n).
本文对Г—环引进了正规反单根,证明了它是特殊根,确立了Г—环M、M的右算子环R[Г,M]、矩阵Г_(n,m)—环及环的正规反单根之间的关系。
3) positive root
正根
1.
The positive roots x_n(n→∞)of functional equation of the type x~n+f(x)=1,when f (x) is monotonously differentiable or analytic,are found to have three substantially different asymptotic characters.
本文讨论了函数方程x~n+f(x)=1在f(x)为单调可微或解析的条件下,其正根x_n(n→∞)的渐近性;得到了当f(1)的值不同时,x_n有三种本质不同的渐近性。
4) positive radical
阳根;正根
5) normal
[英]['nɔ:ml] [美]['nɔrmḷ]
正规
1.
On inverse limits proposition of normal strong screenable spaces;
正规强可遮空间的逆极限性质
2.
Inverse limits and infinite tychonoff products about collectionwise subnormal spaces;
集体次正规空间的逆极限与无限Tychonoff积
3.
The Properties of the Normal Mapping Cylinder (Ⅱ);
正规映射柱的性质(Ⅱ)
6) Normality
[英][nɔ:'mæləti] [美][nɔr'mælətɪ]
正规
1.
Normality Involes an Exceptional Function;
涉及例外函数的一个正规定则
2.
In this paper we discuss the hyponormality and normality of toeplitz operators on the Bergman space,we conclude if f,g∈H~∞ and T_f(T_g)~*=(T_g)~*T_f,then either f or g must be a constant.
讨论 Bergman 空间上 Toeplitz 算子的正规性及亚正规性问题。
3.
In order to investigate the rationality of a fuzzy choice function,Banerjee proposed some rationality conditions,such as normality,condition A and B and weak fuzzy order.
为研究模糊选择函数的理性化问题,Banerjee提出了四个合理性条件:正规性,条件A,条件B及弱模糊序,讨论了四个条件之间的独立性问题。
补充资料:二根──利钝二根
【二根──利钝二根】
﹝出析玄记﹞
析玄云:见道行人,根有二种。谓须阤洹初果之人,破惑见理,名为见道。(梵语须阤洹,华言入流,谓预入圣人之流也。)
[一、钝根名随信行],婆沙论云:由彼依信随信起行,谓此一类行人,从来性多钝故,自不披阅教文,但信他人言说而得悟道,故名随信行。
[二、利根名随法行],婆沙论云:由彼依法随法起行,谓此一类行人,从来性多利故,不信他言,但自披阅教典,而得悟道,故名随法行。
﹝出析玄记﹞
析玄云:见道行人,根有二种。谓须阤洹初果之人,破惑见理,名为见道。(梵语须阤洹,华言入流,谓预入圣人之流也。)
[一、钝根名随信行],婆沙论云:由彼依信随信起行,谓此一类行人,从来性多钝故,自不披阅教文,但信他人言说而得悟道,故名随信行。
[二、利根名随法行],婆沙论云:由彼依法随法起行,谓此一类行人,从来性多利故,不信他言,但自披阅教典,而得悟道,故名随法行。
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参考词条