例句與造句

1. The bounded linear operators on the space of rd o
   空間上的有界線性算子
2. Best approaching of bounded linear operator in reproducing kernel space
   再生核空間的有界線性算子的最佳逼近
3. Bounded linear operator
   有界線性算子
4. Let h be an infinite dimensional complex hilbert space , b ( h ] the banach algebra of all bounded linear operators on h , and s ( h ) the space of all symmetric operators on h . let l be a real linear , weakly continuous rank one preserver of s ( h )
   設(shè)h是無限維復的hilbert空間， b ( h )為h上的有界線性算子全體組成的banach代數(shù)， s ( h )為h上的對稱算子全體
5. We study the spectral theory of bounded linear operators and the characterization of ci operators by way of mbekhta ' s subspaces . we find a series of operators which are ci operators by the defination and the characterization of ci operators given by weibang gong in [ 3 ]
   利用mbekhta子空間研究一般有界線性算子的譜理論以及描述ci算子的特征；用ci算子的定義和判定方法尋找更廣泛的ci算子；同時還討論了廣義逆算子和ci算子及mbekhta子空間的關(guān)系。
6. It's difficult to find bounded linear operator in a sentence. 用bounded linear operator造句挺難的
7. Research on quadratic numerical range of bounded linear operators zhang jingjie abstract the study of numerical range started in 1918 - 1919 by toeplitz and hausdorff when they first proved that w ( a ) is always convex , since then , the study of numerical range theory had been one of the most active research areas
   自toeplitz和hausdorff在1918 - 1919年首先證明了toeplitz - hausdorff定理以后，有關(guān)數(shù)值域、數(shù)值半徑以及各種廣義數(shù)值域及其數(shù)值域半徑的研究變得非?；钴S。
8. After we define the n - numerical range of bounded linear operators on a hilbert space , we find that the n - numerical range have a series properties very similar to that of the quadratic numerical range . at the same time , we prove that under certain conditions , wn ( a ) c w ~ ( a ) and that when h is finite dimensional and dimti = n , we have a ( a ) = wn ( a ) . therefore , it is nature to guess that when h is an infinite dimensional hilbert space , for any space decomposition dn ? ?
   首先給出了n次數(shù)值域的定義，我們發(fā)現(xiàn)n次數(shù)值域不但具有一系列和二次數(shù)值域類似的性質(zhì)，而且在給定的條件下還有n次數(shù)值域包含在二次數(shù)值域當中，另外當是n維hilbert空間時，它的n次數(shù)值域就等于它的譜集，前面的結(jié)論促使我們猜想，當是無限維hilbert空間時，對的任意的空間分解d _ n ，都應該有下面的式子成立： ( a ) = _ ( d _ n d ) w _ ( d _ n ) ~ n ( a ) 。