结论算子范数对于估计有界线性算子乘积与和的谱半径是至关重要的。
Conclusion Norm of operator is very important to estimate the spectral radius of operator.
本文研究了乘积空间中非线性算子的极大极小不动点和迭代法。
In this paper, we study minimal and maximal fixed point theorems and iterative technique for nonlinear operators in product Spaces.
首先以最大乘积算子作为模糊集的演算算子,证明了最大乘积算子满足分配率。
Max and product operators were firstly used as computation operators of fuzzy sets whose distributive law was proved.
用球调和的方法研究了一类乘积空间上奇异积分算子的有界性,所获得的结果给出了以往奇异积分算子有界性的应用。
By using the method of spherical harmonic, the boundedness of a kind of singular integral operator in product domains is given in this paper.
应用算子理论方法,给出了一个C -正则预解族的左乘积扰动定理。
By using the approach of basic operator theory, a left multiplicative perturbation theorem of Cregularized resolvent families is proved.
应用算子理论方法,给出了一个C -正则预解族的左乘积扰动定理。
By using the approach of basic operator theory, a left multiplicative perturbation theorem of Cregularized resolvent families is proved.
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