Using the resolvent operator technique, we obtain the approximate solution to a system of set-valued quasi-variational inclusions.
利用预解式算子技巧构造了一类求变分包含逼近解的迭代算法,并讨论了由此算法产生的迭代序列的收敛性。
The purpose of this paper is to introduce a new class of general mixed quasi-variational inclusions with fuzzy set-valued mappings.
本文引入一类新的带有模糊集值映象的一般混合拟变分包。
In this paper, the existence of solution to the variational inclusions concerning intermediate derivatives is discussed in the Banach space.
利用这些概念和标量导数研究了变分不等式问题解的存在性。
A new iterative algorithms to approximate the solution of the class of nonlinear implicit quasi variational inclusions in Banach space is constructed using resolvent operator.
利用预解式算子技巧构造了一类求变分包含逼近解的迭代算法,并讨论了由此算法产生的迭代序列的收敛性。
In chapter four, we consider a more general form of generalized nonlinear variational inclusions and prove the existence of solutions for these variational inclusions in H-space.
在第四章中,我们考虑了一类更一般形式的广义非线性变分包含并证明了它在H -空间中解的存在性。
This paper presents a new auxiliary variational inequality for solving mixed quasi-variational-like inclusions. First, proved the auxiliary variational inequality has unique solution.
本文对混合拟似变分包含问题提出新的辅助变分不等式,首先证明辅助变分不等式存在唯一解。
This paper presents a new auxiliary variational inequality for solving mixed quasi-variational-like inclusions. First, proved the auxiliary variational inequality has unique solution.
本文对混合拟似变分包含问题提出新的辅助变分不等式,首先证明辅助变分不等式存在唯一解。
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