1) bounded linear operator
有界线性算子
1.
Perturbation of bounded linear operator A_(T,S)~(2) in Hilbert spaces;
Hilbert空间有界线性算子A_(T,S)~(2)的扰动分析
2.
The problem about family of bounded linear operator from n×n matrices to itself;
n×n阵列到自身的有界线性算子族问题
3.
We characterize the generalized regular points of f using the three integer-valued (or infinite) indices M(x0),Mc(x0) and Mr(x0) at x0∈E generated by f and by analyzing generalized inverses of bounded linear operators on Banach spaces,that is,if f′(x0) has a g.
用f产生的在x0∈E处的3个整数(或无穷大)值指标M(x0),Mc(x0)和Mr(x0)和分析Banach空间上有界线性算子的广义逆来刻画f的广义正则点,即,如果f′(x0)在从E上到F的有界线性算子组成的Banach空间B(E,F)内有广义逆,且M(x0),Mc(x0)和Mr(x0)中至少有一个是有限,则x0是f的广义正则点的充分必要条件是多重指标(M(x),M(x),M(x))在x点处连续。
2) power bounded operator
幂有界线性算子
3) Almost surely bounded randomlinear operator
a.s有界线性算子
4) well-bounded linear operator of type(B)
B型良性有界线性算子
5) bounded conjugate bilinear operator
共轭有界双线性算子
6) C0 semigroups of bounded linear operators
有界线性算子C0半群
补充资料:有界线性算子
设t:x→y是从赋范空间x到y的线性算子。 如果当x∈x跑遍所有元素,||t(x)||/||x||的上确界存在且有限,则称t是有界线性算子。此处||*||表示范数。
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参考词条