1) Completely boundedmad
完全有界映射
2) complete mapping
完全映射
1.
Constructions of a special kind of linear complete mappings;
一类线性完全映射的构造
2.
This paper proves that the omni-direction permutations constructed by recurring shift Latin square Dp and Latin square Wp on the finite primary field Fp must be complete mappings on Abelian group Fp, and prove that these omni-direction permutations are also linear functions on Fp.
证明了利用有限素域Fp上的循环移位拉丁方Dp和拉丁方Wp产生的全向置换必定是Fp加群上的完全映射,而且这类全向置换一定是F上的线性函数。
3) totally bounded
完全有界
1.
A remark on limiting case of totally bounded metric set;
关于完全有界度量集的极限状态的一个注
2.
It is proved that the UCEM property of a family of measurable functions F implies that F is totally bounded;the UCEMUP property and PAC learnability still preserve when the family of probabilities is replaced by its closure.
证明了如果函数族F具有UCEM性质 ,那么F是完全有界的。
4) F-perfect mapping
F-完全映射
5) completely positive map
完全正映射
1.
Then for every positive element y in S , there is some completely positive map ψ g:B→B(H) such that ψ g(f)=g*f for f in S , where g*f is the schur product of g and f .
设B是作用在Hilbert空间H上的含单位元的AFC_代数,D是B的典型masa,S是B中的范数闭算子系统并且是ChordalD_双模,则任给S中正元g,存在完全正映射ψg:B→B(H)使得任给f∈S,ψg(f)=gf,其中fg是g与f的Schur积。
6) completely positive maps
完全正映射
1.
A kind cf invariant compact group action on completely positive maps of C+ algebras can determine the isomorphism between these C" algebras.
证明了一类紧群在C+代数的完全正映射上的不变群作用可以决定C+代数间的同构。
2.
By proving a character of completely positive maps similar to Krein Milman theorem ,the existence of the extension of pure completely positive maps is proved.
通过证明完全正映射的一个类似于 Krein- Milman定理的性质 ,给出了一个纯的完全正映射延拓的存在性证明 。
补充资料:发光地寄色界无色界天乘
【发光地寄色界无色界天乘】
谓三地菩萨,明修八禅定行,同于色界四禅,无色界四空处,故云发光地寄色无色界天乘。(八禅定者,色界、无色界各四禅定也。四禅者,初禅、二禅、三禅、四禅也。四空者,即空处、识处、无所有处、非非想处也。)
谓三地菩萨,明修八禅定行,同于色界四禅,无色界四空处,故云发光地寄色无色界天乘。(八禅定者,色界、无色界各四禅定也。四禅者,初禅、二禅、三禅、四禅也。四空者,即空处、识处、无所有处、非非想处也。)
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