This paper studies the locally bounded property of a generalized infinite particle system with zero range interactions and the dissipation of the resolvent operator of the system generator.
研究了广义零程粒子系统生成元的局部有界性和系统生成元预解算子的局部散逸性。
Finally, the application of bounded homogeneous operator space to generalized inverses of operator are given in this paper as well.
最后,我们给出有界齐性算子空间在算子广义逆问题上的应用。
A novel neural network model, named delayed standard neural network model (DSNNM), is proposed, which is the interconnection of a linear dynamic system and a bounded static delayed nonlinear operator.
提出一种新的神经网络模型—时滞标准神经网络模型(DSNNM),它由线性动力学系统和有界静态时滞非线性算子连接而成。
Here, operator B satisfies relative weak conditions such as B satisfies essence bounded.
这里,算子B满足较弱的条件如B本征有界。
By using the semigroup of bounded linear operator, a new locally convex vector topological is introduced, and some propositions of it are given.
利用有界线性算子半群,引入了一新的局部凸向量拓扑,并对其基本性质进行了讨论。
By using the C-semigroup of bounded linear operator, a new locally convex vector topological is introduced, and some propositions of it are given.
利用C -半群的概念,引入一新的局部凸向量拓扑,并对其基本性质以及在新的局部凸线性拓扑意义下c -半群的性质进行初步研究。
By using the C-semigroup of bounded linear operator, a new locally convex vector topological is introduced, and some propositions of it are given.
利用C -半群的概念,引入一新的局部凸向量拓扑,并对其基本性质以及在新的局部凸线性拓扑意义下c -半群的性质进行初步研究。
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