1) Ko-the dual
K-othe对偶
1.
The Topology properties of Space(X,T) was studied using vector-valued sequence space l1(X) and Ko-the duals.
利用矢值序列空间l1(X)及K-othe对偶来研究局部凸拓扑空间(x,t)的拓扑性质,分别得到了(X,T)是桶形空间的特征;(X,T)是σ-拟桶的特征及一个σ-拟桶空间是半核的特征。
2) Kthe sequence space
K¨othe序列空间
1.
By the result, a sufficient condition for that Orlicz sequence spaces has the weak Dunford-Pettis property is given, while the sufficient and necessary condition for that Kthe sequence space X with the semi-Fatou property has Schur property is the space has weak Schur property.
给出了Qrlicz序列空间具有Schur性质的充分必要条件,作为推论,给出了有关Qrlicz序列空间具有弱Dunford-Pettis性质的一个充分条件;同时得到了具有半Fatou性质的K¨othe序列空间X具有Schur性质的充分必要条件是该空间具有弱Schur性质。
3) K o ..the paired
Kthe对偶空间
4) arsenazo K
偶氮肿K
5) Arsenazo-K
偶氮胂K
1.
Spectrophotometric Determination of Nickel in Ferrophosphorus with Arsenazo-K;
偶氮胂K光度法测定磷铁中镍
6) K-quasi-additive fuzzy number valued integral
对偶K-拟可加模糊值积分
1.
The first part: at first, on the K- quasi-additive fuzzy measures space, aiming at a kind of(?)-integrable fuzzy number valued functions, the dual K-quasi-additive fuzzy number valued integral is established by using Darboux upper-sum, and the new integral transformation theorem is obtained by introducing inductive operator K.
第一部分:首先在K-拟可加模糊测度空间上,针对一类(?)-可积模糊值函数,用达布上和定义了对偶K-拟可加模糊值积分,并通过引入诱导算子K获得这种新型积分的转换定理。
补充资料:Harnack不等式(对偶Harnack不等式)
Harnack不等式(对偶Harnack不等式)
quality (dual Hatnack inequality) Harnack in-
【补注】一直到G的边界的H助nack不等式,见【AZI.l翻..‘不等式(对停H山丸朗k不等不)[ Har.改沁-勺函勺(d切红Hat’I犯‘k如为uaJ卿);rap.姗二p魄HcT助(月加湘oe)] 给出正调和函数的两个值之比u(x)/“(y)的上界和下界估计的一个不等式,由A.Hai,剐火(汇IJ)得到.令u)0是n维E议当d空间的区域G中的一个调和函数;令E。(y)是中心在点y处半径为;的球{x:}x一y!<;}.若闭包万了刃.CG,则对于所有的、“凡(,),o
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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